Time bar (total: 52.0s)
| 1× | search |
| Probability | Valid | Unknown | Precondition | Infinite | Domain | Can't | Iter |
|---|---|---|---|---|---|---|---|
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 0 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 1 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 2 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 3 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 4 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 5 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 6 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 7 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 8 |
| 0% | 0% | 99.7% | 0.3% | 0% | 0% | 0% | 9 |
| 0% | 0% | 97.8% | 0.3% | 0% | 1.9% | 0% | 10 |
| 0% | 0% | 97.4% | 0.3% | 0% | 2.3% | 0% | 11 |
| 0% | 0% | 94.8% | 0.3% | 0% | 4.9% | 0% | 12 |
Compiled 35 to 24 computations (31.4% saved)
| 3.3s | 14033× | body | 256 | invalid |
| 2.1s | 8256× | body | 256 | valid |
| 293.0ms | 1210× | body | 256 | infinite |
| 2× | egg-herbie |
| 1288× | distribute-lft-in |
| 1264× | distribute-rgt-in |
| 1130× | fma-def |
| 712× | cancel-sign-sub-inv |
| 502× | distribute-lft-neg-in |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 172 | 1328 |
| 1 | 565 | 1264 |
| 2 | 2210 | 1232 |
| 0 | 6 | 6 |
| 1× | saturated |
| 1× | node limit |
| Inputs |
|---|
0 |
1 |
2 |
3 |
4 |
5 |
| Outputs |
|---|
0 |
1 |
2 |
3 |
4 |
5 |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 U) n) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 U (pow.f64 (/.f64 l Om) 2)) (-.f64 n U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 t) U) (-.f64 (-.f64 n (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 t (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 l) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 n n) Om))) (*.f64 (*.f64 l (pow.f64 (/.f64 n Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 Om) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) n))) (*.f64 (*.f64 Om (pow.f64 (/.f64 l n) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 U*) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 U* (pow.f64 (/.f64 l Om) 2)) (-.f64 U n))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) t) (-.f64 (-.f64 U (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 t U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) l) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 U U) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 U Om) 2)) (-.f64 l U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) Om) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) U))) (*.f64 (*.f64 n (pow.f64 (/.f64 l U) 2)) (-.f64 Om U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U*) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 l (*.f64 2 (/.f64 (*.f64 t t) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 t Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 Om (*.f64 2 (/.f64 (*.f64 l l) t))) (*.f64 (*.f64 n (pow.f64 (/.f64 l t) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 U* (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 Om Om) l))) (*.f64 (*.f64 n (pow.f64 (/.f64 Om l) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 U* U*) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 U* Om) 2)) (-.f64 U l))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) U*))) (*.f64 (*.f64 n (pow.f64 (/.f64 l U*) 2)) (-.f64 U Om))))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (fma.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U* U)) (fma.f64 (*.f64 l (/.f64 l Om)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 U) n) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 U (pow.f64 (/.f64 l Om) 2)) (-.f64 n U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 U) (*.f64 n (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 U (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 n U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 U (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 n U*))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 U (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 (-.f64 n U*))) (fma.f64 (*.f64 l (/.f64 l Om)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 t) U) (-.f64 (-.f64 n (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 t (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 t) (*.f64 U (-.f64 (-.f64 n (*.f64 2 (/.f64 l (/.f64 Om l)))) (*.f64 t (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 U t)) (-.f64 n (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 t (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 U t)) (fma.f64 t (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U* U)) (fma.f64 (*.f64 l (/.f64 l Om)) -2 n)))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 l) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 n n) Om))) (*.f64 (*.f64 l (pow.f64 (/.f64 n Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 l) (*.f64 U (-.f64 (+.f64 t (*.f64 -2 (/.f64 n (/.f64 Om n)))) (*.f64 l (*.f64 (pow.f64 (/.f64 n Om) 2) (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 U l)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 n Om) n) (*.f64 (-.f64 U U*) (*.f64 l (pow.f64 (/.f64 n Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 U l) (fma.f64 l (*.f64 (pow.f64 (/.f64 n Om) 2) (-.f64 U* U)) (fma.f64 (*.f64 n (/.f64 n Om)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 Om) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) n))) (*.f64 (*.f64 Om (pow.f64 (/.f64 l n) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 Om U)) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) n))) (*.f64 (-.f64 U U*) (*.f64 Om (pow.f64 (/.f64 l n) 2)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 U Om)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l n) l) (*.f64 Om (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l n) 2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 Om) (*.f64 U (fma.f64 Om (*.f64 (pow.f64 (/.f64 l n) 2) (-.f64 U* U)) (fma.f64 (*.f64 l (/.f64 l n)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 U*) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 U* (pow.f64 (/.f64 l Om) 2)) (-.f64 U n))))) |
(sqrt.f64 (*.f64 (*.f64 U (*.f64 2 U*)) (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 U* (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U n))))))) |
(sqrt.f64 (*.f64 (*.f64 U (*.f64 2 U*)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 U* (-.f64 U n))))))) |
(sqrt.f64 (*.f64 (*.f64 2 U*) (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 U* (-.f64 U n)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) t) (-.f64 (-.f64 U (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 t U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n t)) (-.f64 U (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 t U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n t)) (-.f64 U (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 t U*))))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t (-.f64 U (fma.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 t U*)) (*.f64 2 (*.f64 l (/.f64 l Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) l) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 U U) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 U Om) 2)) (-.f64 l U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n l)) (-.f64 (+.f64 t (*.f64 -2 (/.f64 U (/.f64 Om U)))) (*.f64 n (*.f64 (pow.f64 (/.f64 U Om) 2) (-.f64 l U*)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n l)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 U Om) U) (*.f64 n (*.f64 (pow.f64 (/.f64 U Om) 2) (-.f64 l U*))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n l) (fma.f64 n (*.f64 (pow.f64 (/.f64 U Om) 2) (neg.f64 (-.f64 l U*))) (fma.f64 (*.f64 U (/.f64 U Om)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) Om) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) U))) (*.f64 (*.f64 n (pow.f64 (/.f64 l U) 2)) (-.f64 Om U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n Om)) (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 U l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l U) 2) (-.f64 Om U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n Om)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l U) l) (*.f64 n (*.f64 (pow.f64 (/.f64 l U) 2) (-.f64 Om U*))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n Om) (-.f64 t (fma.f64 (pow.f64 (/.f64 l U) 2) (*.f64 n (-.f64 Om U*)) (*.f64 2 (*.f64 l (/.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U*) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U* (-.f64 (-.f64 t (*.f64 2 (/.f64 l (/.f64 Om l)))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U*)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U* U))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U*)) (fma.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)) (fma.f64 (*.f64 l (/.f64 l Om)) -2 t)))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 l (*.f64 2 (/.f64 (*.f64 t t) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 t Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 l (+.f64 (*.f64 2 (/.f64 t (/.f64 Om t))) (*.f64 n (*.f64 (pow.f64 (/.f64 t Om) 2) (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 l (fma.f64 2 (*.f64 (/.f64 t Om) t) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 t Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 n (*.f64 (pow.f64 (/.f64 t Om) 2) (-.f64 U* U)) (fma.f64 (*.f64 t (/.f64 t Om)) -2 l))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 Om (*.f64 2 (/.f64 (*.f64 l l) t))) (*.f64 (*.f64 n (pow.f64 (/.f64 l t) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (+.f64 Om (*.f64 -2 (/.f64 (*.f64 l l) t))) (*.f64 n (*.f64 (pow.f64 (/.f64 l t) 2) (-.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 Om (fma.f64 2 (*.f64 (/.f64 l t) l) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l t) 2)))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 n (*.f64 (pow.f64 (/.f64 l t) 2) (-.f64 U* U)) (fma.f64 (*.f64 l (/.f64 l t)) -2 Om))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 U* (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U t))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 U* (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U t)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 U* (fma.f64 2 (*.f64 (/.f64 l Om) l) (*.f64 (*.f64 (-.f64 U t) n) (pow.f64 (/.f64 l Om) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 U* (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 (-.f64 U t) n) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 Om Om) l))) (*.f64 (*.f64 n (pow.f64 (/.f64 Om l) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 (+.f64 t (*.f64 -2 (/.f64 Om (/.f64 l Om)))) (*.f64 n (*.f64 (pow.f64 (/.f64 Om l) 2) (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 Om l) Om) (*.f64 (-.f64 U U*) (*.f64 n (pow.f64 (/.f64 Om l) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (fma.f64 n (*.f64 (pow.f64 (/.f64 Om l) 2) (-.f64 U* U)) (fma.f64 (*.f64 Om (/.f64 Om l)) -2 t)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 U* U*) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 U* Om) 2)) (-.f64 U l))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (+.f64 t (*.f64 -2 (/.f64 U* (/.f64 Om U*)))) (*.f64 n (*.f64 (pow.f64 (/.f64 U* Om) 2) (-.f64 U l)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (*.f64 (/.f64 U* Om) U*) (*.f64 n (*.f64 (pow.f64 (/.f64 U* Om) 2) (-.f64 U l))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 (*.f64 (-.f64 U l) n) (pow.f64 (/.f64 U* Om) 2) (*.f64 2 (*.f64 U* (/.f64 U* Om))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) U*))) (*.f64 (*.f64 n (pow.f64 (/.f64 l U*) 2)) (-.f64 U Om))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 U* l))) (*.f64 (*.f64 n (pow.f64 (/.f64 l U*) 2)) (-.f64 U Om)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 (/.f64 l U*) l) (*.f64 (*.f64 n (pow.f64 (/.f64 l U*) 2)) (-.f64 U Om))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 (pow.f64 (/.f64 l U*) 2) (*.f64 n (-.f64 U Om)) (*.f64 2 (*.f64 l (/.f64 l U*)))))))) |
Compiled 40 to 29 computations (27.5% saved)
| 1× | egg-herbie |
| 990× | fma-neg |
| 830× | fma-def |
| 674× | unsub-neg |
| 658× | cancel-sign-sub-inv |
| 656× | distribute-lft-neg-out |
Useful iterations: 4 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 24 | 83 |
| 1 | 60 | 79 |
| 2 | 196 | 79 |
| 3 | 972 | 75 |
| 4 | 4378 | 73 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 2 U) (-.f64 (fma.f64 (*.f64 l (/.f64 l Om)) -2 t) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (fma.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U* U)) (fma.f64 (*.f64 l (/.f64 l Om)) -2 t))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
Compiled 167 to 86 computations (48.5% saved)
4 alts after pruning (4 fresh and 0 done)
| Pruned | Kept | Total | |
|---|---|---|---|
| New | 3 | 3 | 6 |
| Fresh | 0 | 1 | 1 |
| Picked | 0 | 0 | 0 |
| Done | 0 | 0 | 0 |
| Total | 3 | 4 | 7 |
| Status | Accuracy | Program |
|---|---|---|
| ▶ | 45.2% | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| ▶ | 44.5% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
| ▶ | 41.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
Compiled 99 to 65 computations (34.3% saved)
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 91.9% | (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))) |
| ✓ | 90.2% | (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) |
| ✓ | 80.9% | (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) |
| ✓ | 65.9% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
Compiled 152 to 45 computations (70.4% saved)
69 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 6.0ms | t | @ | 0 | (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) |
| 4.0ms | Om | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
| 4.0ms | U | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
| 3.0ms | Om | @ | -inf | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
| 2.0ms | l | @ | inf | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
| 1× | batch-egg-rewrite |
| 904× | expm1-udef |
| 900× | log1p-udef |
| 518× | add-sqr-sqrt |
| 506× | pow1 |
| 506× | *-un-lft-identity |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 23 | 224 |
| 1 | 498 | 212 |
| 2 | 6932 | 212 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) |
(*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 2) (pow.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f))) |
(((+.f64 (*.f64 (*.f64 n (/.f64 l Om)) U*) (*.f64 (*.f64 n (/.f64 l Om)) (neg.f64 U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 U* (*.f64 n (/.f64 l Om))) (*.f64 (neg.f64 U) (*.f64 n (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 l (/.f64 Om (*.f64 n (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 1 (/.f64 Om (*.f64 (*.f64 l n) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (neg.f64 (*.f64 (*.f64 l n) (-.f64 U* U))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (neg.f64 l) (*.f64 n (-.f64 U* U))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) 1) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (*.f64 n (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (*.f64 n (-.f64 U* U)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n (-.f64 U* U)) 3) (pow.f64 (/.f64 l Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f))) |
(((+.f64 (*.f64 (*.f64 2 n) (*.f64 U t)) (*.f64 (*.f64 2 n) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) (*.f64 (*.f64 2 (*.f64 n U)) t)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (*.f64 U t) (*.f64 2 n)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U))) (*.f64 t (*.f64 2 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) (pow.f64 (*.f64 2 n) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f))) |
(((+.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 U t)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((+.f64 (*.f64 (*.f64 U t) 1) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (+.f64 (pow.f64 (*.f64 U t) 3) (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 3)) (+.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (-.f64 (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) (*.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (-.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) (-.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 U (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3)) U) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)) U) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3) (pow.f64 U 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((fma.f64 U t (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f)) ((fma.f64 t U (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))))))) #f))) |
| 1× | egg-herbie |
| 1126× | fma-def |
| 1064× | times-frac |
| 1030× | associate-/l* |
| 718× | associate-/r* |
| 570× | *-commutative |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 778 | 29290 |
| 1 | 2426 | 28286 |
| 2 | 7948 | 28166 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 3))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 3))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 5))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (*.f64 (pow.f64 Om 5) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l))))) |
(+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l))) (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 5) (pow.f64 l 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (*.f64 (pow.f64 Om 6) (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t))) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) 3))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))))))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U)) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(+.f64 (*.f64 (*.f64 n (/.f64 l Om)) U*) (*.f64 (*.f64 n (/.f64 l Om)) (neg.f64 U))) |
(+.f64 (*.f64 U* (*.f64 n (/.f64 l Om))) (*.f64 (neg.f64 U) (*.f64 n (/.f64 l Om)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 1) |
(/.f64 l (/.f64 Om (*.f64 n (-.f64 U* U)))) |
(/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) |
(/.f64 1 (/.f64 Om (*.f64 (*.f64 l n) (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) Om) |
(/.f64 (neg.f64 (*.f64 (*.f64 l n) (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U U*)) |
(/.f64 (*.f64 (neg.f64 l) (*.f64 n (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) 1) Om) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 2) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 2)) |
(log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (*.f64 n (-.f64 U* U)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (*.f64 n (-.f64 U* U)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (-.f64 U* U)) 3) (pow.f64 (/.f64 l Om) 3))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(+.f64 (*.f64 (*.f64 2 n) (*.f64 U t)) (*.f64 (*.f64 2 n) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) (*.f64 (*.f64 2 (*.f64 n U)) t)) |
(+.f64 (*.f64 (*.f64 U t) (*.f64 2 n)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 2 n))) |
(+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U)))) |
(+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U))) (*.f64 t (*.f64 2 (*.f64 n U)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 2) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3) 1/3) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) (*.f64 2 n))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) (pow.f64 (*.f64 2 n) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(+.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
(+.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 U t)) |
(+.f64 (*.f64 (*.f64 U t) 1) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 1)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) 1) |
(/.f64 (+.f64 (pow.f64 (*.f64 U t) 3) (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 3)) (+.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (-.f64 (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) (*.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))))) |
(/.f64 (-.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) (-.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (*.f64 U (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(/.f64 (*.f64 (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3)) U) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)) U) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 1) |
(pow.f64 (cbrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 3) |
(pow.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 2) |
(sqrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 2)) |
(log.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) |
(cbrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3) (pow.f64 U 3))) |
(expm1.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(exp.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(fma.f64 U t (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
(fma.f64 t U (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (sqrt.f64 2)) (/.f64 (/.f64 l Om) (fma.f64 -2 (/.f64 l (/.f64 Om l)) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 3))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 3)) (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (sqrt.f64 2)) (/.f64 (/.f64 l Om) (fma.f64 -2 (/.f64 l (/.f64 Om l)) t))) (fma.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (sqrt.f64 2)) (*.f64 (pow.f64 (/.f64 l Om) 3) (/.f64 n (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 2)))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) Om)) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 3))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 5))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 3)) (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (*.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (*.f64 n n) (pow.f64 l 5)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (pow.f64 Om 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (sqrt.f64 2)) (/.f64 (/.f64 l Om) (fma.f64 -2 (/.f64 l (/.f64 Om l)) t))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (sqrt.f64 2)) (*.f64 (pow.f64 (/.f64 l Om) 3) (/.f64 n (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 2)))) (*.f64 (/.f64 (*.f64 1/16 (sqrt.f64 2)) (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 5)) (/.f64 (pow.f64 l 5) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2))))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (/.f64 n Om) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (sqrt.f64 -1)) (/.f64 (*.f64 Om (sqrt.f64 -2)) l))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))))) |
(-.f64 (*.f64 (*.f64 1/2 (*.f64 (/.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (*.f64 l (sqrt.f64 -1))) (*.f64 Om (sqrt.f64 -2)))) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (sqrt.f64 -1)) (/.f64 (*.f64 Om (sqrt.f64 -2)) l))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (/.f64 (*.f64 n (*.f64 (pow.f64 l 3) (pow.f64 (sqrt.f64 -1) 3))) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2))))))))) |
(-.f64 (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (*.f64 l (sqrt.f64 -1))) (*.f64 Om (sqrt.f64 -2)))) (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 2)) (*.f64 (/.f64 (*.f64 n (*.f64 -1 (sqrt.f64 -1))) (sqrt.f64 -2)) (pow.f64 (/.f64 l Om) 3))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 Om (sqrt.f64 -2))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (*.f64 (pow.f64 Om 5) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (sqrt.f64 -1)) (/.f64 (*.f64 Om (sqrt.f64 -2)) l))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (sqrt.f64 -2)) (*.f64 (pow.f64 l 5) (pow.f64 (sqrt.f64 -1) 5))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (/.f64 (*.f64 n (*.f64 (pow.f64 l 3) (pow.f64 (sqrt.f64 -1) 3))) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2))))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (*.f64 l (sqrt.f64 -1))) (*.f64 Om (sqrt.f64 -2)))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 3) (/.f64 (/.f64 (*.f64 (*.f64 (*.f64 n n) (pow.f64 (sqrt.f64 -1) 5)) (pow.f64 l 5)) (sqrt.f64 -2)) (pow.f64 Om 5)))) (fma.f64 1/8 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) 2)) (*.f64 (/.f64 (*.f64 n (*.f64 -1 (sqrt.f64 -1))) (sqrt.f64 -2)) (pow.f64 (/.f64 l Om) 3))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (/.f64 n Om) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2))))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 l (sqrt.f64 -1)) (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 Om (/.f64 l (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) |
(+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))) (+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 l (sqrt.f64 -1)) (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 2) (*.f64 (pow.f64 l 3) (*.f64 -1 (sqrt.f64 -1)))) (/.f64 (pow.f64 Om 3) U))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 Om (/.f64 l (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))))) |
(+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 (sqrt.f64 -1) l))) (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))) (+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 l (sqrt.f64 -1)) (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) (*.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (*.f64 U U))))))))) |
(+.f64 (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 Om (/.f64 l (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) (/.f64 (*.f64 1/16 (sqrt.f64 2)) (/.f64 (/.f64 (*.f64 (*.f64 (*.f64 n n) (pow.f64 (sqrt.f64 -1) 5)) (*.f64 (pow.f64 l 5) (*.f64 U U))) (pow.f64 Om 5)) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 3)))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 2) (*.f64 (pow.f64 l 3) (*.f64 -1 (sqrt.f64 -1)))) (/.f64 (pow.f64 Om 3) U))) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 n l) (*.f64 U (sqrt.f64 -2)))) Om) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om))) |
(fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) (neg.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))))) |
(fma.f64 1/2 (*.f64 (/.f64 Om l) (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) (/.f64 (neg.f64 (*.f64 (*.f64 n l) (*.f64 U (sqrt.f64 -2)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (*.f64 U (pow.f64 l 3))))))) |
(fma.f64 1/2 (*.f64 (/.f64 Om l) (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) (-.f64 (/.f64 (*.f64 1/8 (pow.f64 Om 3)) (/.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 l 3))) (sqrt.f64 -2)) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 2))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (sqrt.f64 -2))) l)) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2) (sqrt.f64 -2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 3)) (*.f64 (pow.f64 l 5) (*.f64 U U)))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (*.f64 U (pow.f64 l 3)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 Om l) (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) (-.f64 (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (*.f64 (/.f64 (sqrt.f64 -2) (*.f64 U U)) (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 3) (pow.f64 l 5)))) (/.f64 (*.f64 1/8 (pow.f64 Om 3)) (/.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 l 3))) (sqrt.f64 -2)) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) 2)))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om))) (/.f64 (*.f64 Om U) l))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U)))) (*.f64 (*.f64 1/2 (*.f64 (sqrt.f64 2) t)) (sqrt.f64 (/.f64 (*.f64 n (/.f64 (*.f64 Om U) l)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om))) (/.f64 (*.f64 Om U) l))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))) (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 t t) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) 3)) (/.f64 (*.f64 U (pow.f64 Om 3)) (pow.f64 l 3))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (/.f64 (*.f64 n (/.f64 (*.f64 Om U) l)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U)))) (*.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 3) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 5) (pow.f64 l 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om))) (/.f64 (*.f64 Om U) l))))) (fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) 5)) (/.f64 (*.f64 U (pow.f64 Om 5)) (pow.f64 l 5)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))) (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 t t) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) 3)) (/.f64 (*.f64 U (pow.f64 Om 3)) (pow.f64 l 3)))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (/.f64 (*.f64 n (/.f64 (*.f64 Om U) l)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) (fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) 5)) (/.f64 U (/.f64 (pow.f64 l 5) (pow.f64 Om 5))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U)))) (*.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 3) U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 2)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 3)) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 2)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 3)) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))))))) |
(fma.f64 1/16 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 3)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 5)) U))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 2)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 3)) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))))))) |
(fma.f64 1/16 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 3)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 5)) U))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 2)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 t 3)) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) (sqrt.f64 (/.f64 n (/.f64 t U))))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))))) |
(fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) U)))) |
(fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) U)))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 3)) U))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) U))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 3)) U))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) U))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n U) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 5) (pow.f64 t 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 5) U)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 3)) U))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (pow.f64 t 3)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)) 5)) U))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) U)))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 3)) U))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (pow.f64 t 3)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)) 5)) U))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))))) (*.f64 (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) l) t)) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) U)))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) |
(neg.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) l))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 Om U))))))) |
(-.f64 (*.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 Om U))))) (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) l) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))))))) |
(fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 Om U))))) (*.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))))))) |
(-.f64 (fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) 3) (*.f64 U (pow.f64 Om 3))))) (*.f64 -1 (sqrt.f64 -1)))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 Om U)))))) (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) l) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))))) |
(fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 Om U))))) (fma.f64 -1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 5) (*.f64 U (pow.f64 Om 5)))))) (*.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) l) t) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 Om U)))) (sqrt.f64 -1))) (fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) 3) (*.f64 U (pow.f64 Om 3))))) (*.f64 -1 (sqrt.f64 -1)))) (*.f64 (/.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 2) (pow.f64 t 3))) (*.f64 (pow.f64 l 5) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) 5)) (*.f64 U (pow.f64 Om 5))))))) (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) l) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (neg.f64 l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (*.f64 n l)) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) Om) (/.f64 n (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)) 2)))) (/.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) l)) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) U)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (neg.f64 l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (*.f64 n l)) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (neg.f64 l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) 2))) (*.f64 l (*.f64 n n))) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U* U) 3))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) Om) (/.f64 n (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)) 2)))) (/.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) l)) (-.f64 (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)) 2)) (/.f64 l (*.f64 Om Om)))) (sqrt.f64 (/.f64 (/.f64 1 U) (pow.f64 (-.f64 U* U) 3)))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U)))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) t))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U (pow.f64 t 3)))) (sqrt.f64 2)) (/.f64 (/.f64 (pow.f64 Om 3) (*.f64 l l)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)))) (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) t))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) t))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U (pow.f64 t 3)))) (sqrt.f64 2)) (/.f64 (/.f64 (pow.f64 Om 3) (*.f64 l l)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)))) (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U (-.f64 U* U))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) t))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))))) (*.f64 (*.f64 1/2 (/.f64 (sqrt.f64 2) (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U*)))) (sqrt.f64 (/.f64 U (/.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (pow.f64 n 3)))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (*.f64 U* U*)) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) 3))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U*))) (sqrt.f64 (/.f64 U (/.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (pow.f64 n 3))))) (*.f64 (/.f64 (*.f64 -1/8 (sqrt.f64 2)) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) 3)) U))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (*.f64 (pow.f64 Om 6) (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t))) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) 3))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 6)) (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 U* 3)) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 7)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) 3)))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (*.f64 U* U*)) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) 3)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U*))) (sqrt.f64 (/.f64 U (/.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (pow.f64 n 3))))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 6)) (/.f64 (pow.f64 U* 3) (/.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (pow.f64 l 6)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 7)) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) 3)))) (*.f64 (/.f64 (*.f64 -1/8 (sqrt.f64 2)) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) 3)) U)))))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l U)))) |
(*.f64 n (neg.f64 (/.f64 (*.f64 l U) Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(*.f64 (/.f64 n Om) (*.f64 l U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(*.f64 (/.f64 n Om) (*.f64 l U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(*.f64 (/.f64 n Om) (*.f64 l U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l U)))) |
(*.f64 n (neg.f64 (/.f64 (*.f64 l U) Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l U)))) |
(*.f64 n (neg.f64 (/.f64 (*.f64 l U) Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U) (/.f64 n (/.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))) n)))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 l l) (*.f64 U U)) Om) (/.f64 (*.f64 n n) Om)) (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)))) Om)) |
(/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)))) Om))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)))) Om))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)))) Om))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) Om) (*.f64 n (*.f64 l U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(*.f64 2 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))))) |
(*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) (*.f64 n (*.f64 U t)))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t))) |
(*.f64 (*.f64 2 n) (*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(fma.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(fma.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(fma.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om) (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 (*.f64 n (*.f64 l l)) (/.f64 Om U)) (/.f64 (*.f64 2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U) |
(*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))) |
(*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U)) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(-.f64 (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om) |
(/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))) |
(*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (/.f64 (*.f64 l U) Om)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 t U) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U)) |
(*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) |
(*.f64 (*.f64 l l) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))) |
(*.f64 (*.f64 l l) (*.f64 U (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om)))) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(+.f64 (*.f64 t U) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) U))) |
(fma.f64 t U (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om))) t)) |
(*.f64 U (+.f64 (*.f64 (*.f64 l l) (fma.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om) (/.f64 -2 Om))) t)) |
(*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om)) |
(neg.f64 (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (/.f64 Om (*.f64 U (*.f64 l l))))) |
(/.f64 (neg.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 (/.f64 Om U) (*.f64 l l))) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 t U (neg.f64 (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(-.f64 (*.f64 U t) (*.f64 (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) Om) (*.f64 U (*.f64 l l)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 t U (neg.f64 (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(-.f64 (*.f64 U t) (*.f64 (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) Om) (*.f64 U (*.f64 l l)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (/.f64 (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 t U (neg.f64 (/.f64 (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(-.f64 (*.f64 U t) (*.f64 (/.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) Om) (*.f64 U (*.f64 l l)))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) |
(fma.f64 U t (/.f64 (*.f64 -2 (*.f64 l l)) (/.f64 Om U))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) |
(fma.f64 U t (/.f64 (*.f64 -2 (*.f64 l l)) (/.f64 Om U))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 t U (fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(fma.f64 U t (fma.f64 -2 (*.f64 (/.f64 l (/.f64 Om l)) U) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) |
(*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))) |
(*.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 U (fma.f64 -2 (/.f64 l (/.f64 Om l)) t) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) |
(*.f64 U (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2)))))) |
(*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U)))))) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(+.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(fma.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l U))) (*.f64 l -2))))) U (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) 1) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(*.f64 1 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))))) (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4)) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 n (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1/2)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) (sqrt.f64 (*.f64 (*.f64 2 n) U))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) (sqrt.f64 (*.f64 (*.f64 2 n) U))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/2) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 3) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(fabs.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2)) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1)) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U))) |
(sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(+.f64 (*.f64 (*.f64 n (/.f64 l Om)) U*) (*.f64 (*.f64 n (/.f64 l Om)) (neg.f64 U))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 U* (*.f64 n (/.f64 l Om))) (*.f64 (neg.f64 U) (*.f64 n (/.f64 l Om)))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 1) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 l (/.f64 Om (*.f64 n (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 1 (/.f64 Om (*.f64 (*.f64 l n) (-.f64 U* U)))) |
(*.f64 (/.f64 1 Om) (*.f64 (*.f64 n l) (-.f64 U* U))) |
(/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (neg.f64 (*.f64 (*.f64 l n) (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (neg.f64 l) (/.f64 (neg.f64 Om) (*.f64 n (-.f64 U* U)))) |
(*.f64 1 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (neg.f64 l) (/.f64 (neg.f64 Om) (*.f64 n (-.f64 U* U)))) |
(*.f64 1 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) |
(/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U U*)))) |
(/.f64 (/.f64 (*.f64 n l) Om) (/.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (-.f64 (pow.f64 U* 3) (pow.f64 U 3)))) |
(*.f64 (/.f64 (*.f64 n (/.f64 l Om)) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) |
(/.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U U*)) |
(/.f64 (/.f64 (*.f64 n l) Om) (/.f64 (+.f64 U* U) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(*.f64 (/.f64 (*.f64 n (/.f64 l Om)) (+.f64 U* U)) (-.f64 (*.f64 U* U*) (*.f64 U U))) |
(/.f64 (*.f64 (neg.f64 l) (*.f64 n (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (neg.f64 l) (/.f64 (neg.f64 Om) (*.f64 n (-.f64 U* U)))) |
(*.f64 1 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) 1) Om) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 (cbrt.f64 Om) (cbrt.f64 (*.f64 Om Om)))) |
(*.f64 (/.f64 l (cbrt.f64 Om)) (/.f64 (*.f64 n (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om)))) |
(/.f64 (/.f64 (*.f64 (*.f64 l n) (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 1) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 3) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3) 1/3) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 2) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 2)) |
(fabs.f64 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) |
(log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (*.f64 n (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 3)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (*.f64 n (-.f64 U* U)) 3))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (-.f64 U* U)) 3) (pow.f64 (/.f64 l Om) 3))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) 1)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om) |
(*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)) |
(+.f64 (*.f64 (*.f64 2 n) (*.f64 U t)) (*.f64 (*.f64 2 n) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) |
(*.f64 (*.f64 2 n) (fma.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om) (*.f64 U t))) |
(*.f64 (*.f64 2 n) (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) (*.f64 (*.f64 2 (*.f64 n U)) t)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 (*.f64 U t) (*.f64 2 n)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 2 n))) |
(*.f64 (*.f64 2 n) (fma.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om) (*.f64 U t))) |
(*.f64 (*.f64 2 n) (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) |
(+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U)))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (*.f64 2 (*.f64 n U))) (*.f64 t (*.f64 2 (*.f64 n U)))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) 1) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t))))) |
(*.f64 (/.f64 (*.f64 2 (*.f64 n U)) (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) t))))) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 3))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(/.f64 (*.f64 (*.f64 2 n) U) (/.f64 (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)))) |
(*.f64 (/.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 2))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 2) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 3) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2) 1/2) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 2)) |
(fabs.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3) 1/3) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) 2)) |
(fabs.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U)))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) (*.f64 2 n))) |
(*.f64 (*.f64 2 n) (fma.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om) (*.f64 U t))) |
(*.f64 (*.f64 2 n) (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 3)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3))) |
(cbrt.f64 (*.f64 (*.f64 8 (pow.f64 n 3)) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3))) |
(cbrt.f64 (*.f64 (*.f64 (pow.f64 n 3) 8) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) (pow.f64 (*.f64 2 n) 3))) |
(cbrt.f64 (*.f64 (*.f64 8 (pow.f64 n 3)) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3))) |
(cbrt.f64 (*.f64 (*.f64 (pow.f64 n 3) 8) (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 (*.f64 2 n) U)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t) (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 U t)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(+.f64 (*.f64 (*.f64 U t) 1) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 1)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) 1) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(/.f64 (+.f64 (pow.f64 (*.f64 U t) 3) (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) 3)) (+.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (-.f64 (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) (*.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))))) |
(/.f64 (+.f64 (pow.f64 (*.f64 U t) 3) (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om)) 3)) (fma.f64 (*.f64 U t) (*.f64 U t) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om)) (-.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om)) (*.f64 U t))))) |
(/.f64 (+.f64 (pow.f64 (*.f64 U t) 3) (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (/.f64 (*.f64 l U) Om)) 3)) (fma.f64 U (*.f64 t (*.f64 U t)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (/.f64 (*.f64 l U) Om)) (*.f64 U (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) t))))) |
(/.f64 (-.f64 (*.f64 (*.f64 U t) (*.f64 U t)) (*.f64 (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) (-.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (*.f64 (fma.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om) (*.f64 U t)) (-.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om)))) (-.f64 (*.f64 U t) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (/.f64 (*.f64 l U) Om)))) |
(/.f64 (-.f64 (*.f64 (*.f64 U U) (*.f64 t t)) (*.f64 (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 2) (*.f64 U U))) (*.f64 U (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))))) |
(/.f64 (*.f64 U (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3))) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 U (/.f64 (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3)))) |
(/.f64 (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 3)) (/.f64 (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) t)))) U)) |
(/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2))) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)) (/.f64 (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) U)) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 2)) (/.f64 (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))) U)) |
(/.f64 (*.f64 (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3)) U) (fma.f64 t t (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) |
(/.f64 U (/.f64 (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) t)))) (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 3)))) |
(/.f64 (+.f64 (pow.f64 t 3) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 3)) (/.f64 (fma.f64 t t (*.f64 (/.f64 l Om) (*.f64 (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) (-.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) t)))) U)) |
(/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)) U) (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))))) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))))) 2)) (/.f64 (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))))) U)) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))) 2)) (/.f64 (-.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))))) U)) |
(pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 1) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(pow.f64 (cbrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 3) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(pow.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3) 1/3) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(pow.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 2) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(sqrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 2)) |
(fabs.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) |
(log.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(cbrt.f64 (pow.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 3)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 3) (pow.f64 U 3))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(expm1.f64 (log1p.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(exp.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) 1)) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(log1p.f64 (expm1.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(fma.f64 U t (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
(fma.f64 t U (*.f64 (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) (*.f64 (/.f64 l Om) U))) |
(fma.f64 t U (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 91.9% | (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))) |
| ✓ | 90.2% | (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
| ✓ | 88.6% | (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) |
| ✓ | 65.9% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
Compiled 180 to 73 computations (59.4% saved)
69 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 12.0ms | n | @ | -inf | (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
| 5.0ms | U | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
| 4.0ms | U* | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
| 4.0ms | n | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
| 2.0ms | U* | @ | 0 | (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
| 1× | batch-egg-rewrite |
| 968× | expm1-udef |
| 552× | add-sqr-sqrt |
| 546× | pow1 |
| 544× | *-un-lft-identity |
| 510× | add-exp-log |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 24 | 248 |
| 1 | 536 | 248 |
| 2 | 7704 | 248 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) |
(*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) |
(*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f))) |
(((+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 (-.f64 U U*))) (sqrt.f64 n)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f))) |
(((+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (pow.f64 (exp.f64 (*.f64 2 (*.f64 n U))) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) (pow.f64 (*.f64 2 n) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f))) |
(((+.f64 (*.f64 U t) (*.f64 U (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((+.f64 (*.f64 t U) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3)) U) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2)) U) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (pow.f64 (exp.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3) (pow.f64 U 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))) (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*))))))) #f))) |
| 1× | egg-herbie |
| 1388× | associate-*r* |
| 1280× | associate-*l* |
| 884× | times-frac |
| 830× | fma-def |
| 600× | associate-/r* |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 681 | 31599 |
| 1 | 2042 | 31313 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 (sqrt.f64 -1) 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/16 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (*.f64 (sqrt.f64 2) (pow.f64 l 6))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 3) l))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U U*) 3) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(*.f64 t U) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(*.f64 t U) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(*.f64 t U) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(*.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4)) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 3) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) |
(+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 1) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) |
(pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 1) |
(pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3) |
(pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3) 1/3) |
(pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 (-.f64 U U*))) (sqrt.f64 n)) 2) |
(sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3)) |
(expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 (*.f64 n U)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1) |
(pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 2) |
(pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 3) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3) 1/3) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) |
(log.f64 (pow.f64 (exp.f64 (*.f64 2 (*.f64 n U))) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) (pow.f64 (*.f64 2 n) 3))) |
(expm1.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(exp.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(+.f64 (*.f64 U t) (*.f64 U (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(+.f64 (*.f64 t U) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) U)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) 1) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(/.f64 (*.f64 (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3)) U) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2)) U) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1) |
(pow.f64 (cbrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 3) |
(pow.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 2) |
(sqrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 2)) |
(log.f64 (pow.f64 (exp.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))))) |
(cbrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3) (pow.f64 U 3))) |
(expm1.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(exp.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om)) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 (/.f64 (*.f64 1/2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 Om (sqrt.f64 2)))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (*.f64 (/.f64 l Om) (/.f64 (sqrt.f64 -1) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) n) (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 2) (*.f64 (sqrt.f64 -1) (*.f64 -1 (pow.f64 l 3))))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) -1/8)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (*.f64 n n) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om)))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (*.f64 (/.f64 l Om) (/.f64 (sqrt.f64 -1) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 3) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) n) (/.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 2) (*.f64 (sqrt.f64 -1) (*.f64 -1 (pow.f64 l 3))))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) -1/8))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (neg.f64 (/.f64 n (/.f64 (/.f64 Om l) (sqrt.f64 -2))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) (sqrt.f64 -2))))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om)))) |
(-.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) Om) (/.f64 l (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (sqrt.f64 -2))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 n (/.f64 (/.f64 Om l) (sqrt.f64 -2))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) (sqrt.f64 -2))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 2) (sqrt.f64 -2)) (pow.f64 l 3)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) Om) (/.f64 l (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (sqrt.f64 -2)))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (/.f64 (/.f64 (*.f64 n (pow.f64 l 3)) (sqrt.f64 -2)) (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 2))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 n (/.f64 (/.f64 Om l) (sqrt.f64 -2))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))) (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 3) (sqrt.f64 -2)) (pow.f64 l 5)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) (sqrt.f64 -2))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) 2) (sqrt.f64 -2)) (pow.f64 l 3)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om)))))) |
(fma.f64 1/16 (*.f64 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))) (/.f64 (pow.f64 Om 5) (*.f64 n n))) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 3) (sqrt.f64 -2)) (pow.f64 l 5))) (-.f64 (fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) Om) (/.f64 l (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (sqrt.f64 -2)))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (/.f64 (/.f64 (*.f64 n (pow.f64 l 3)) (sqrt.f64 -2)) (pow.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) 2))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 n (/.f64 (/.f64 Om l) (sqrt.f64 -2)))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))) l)))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) l)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))) l)) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3)))))))) |
(+.f64 (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) l)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))))) (*.f64 (/.f64 -1/8 (*.f64 (*.f64 n -1) (sqrt.f64 -1))) (/.f64 (*.f64 (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 2))) (*.f64 U (pow.f64 l 3))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))) l)) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (*.f64 U U))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))))))) |
(+.f64 (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) l)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 U (pow.f64 l 3))) (/.f64 (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 2) (*.f64 -1 (sqrt.f64 -1))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 5)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 U (*.f64 U (pow.f64 l 5))))) (/.f64 (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 3) (*.f64 n n)))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 n (*.f64 l U)) (sqrt.f64 -2))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l))) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (*.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))))))) |
(-.f64 (/.f64 (*.f64 (*.f64 1/2 (*.f64 Om (sqrt.f64 -2))) (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) l) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 2)) (*.f64 U (pow.f64 l 3))))))) |
(-.f64 (fma.f64 1/2 (/.f64 Om (/.f64 (/.f64 l (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (sqrt.f64 -2))) (*.f64 (*.f64 1/8 (/.f64 (pow.f64 Om 3) n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 2)) (*.f64 U (pow.f64 l 3))))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 3)) (*.f64 (pow.f64 l 5) (*.f64 U U)))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))) 2)) (*.f64 U (pow.f64 l 3)))))))) |
(-.f64 (fma.f64 1/2 (/.f64 Om (/.f64 (/.f64 l (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (sqrt.f64 -2))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (*.f64 (/.f64 (sqrt.f64 -2) (pow.f64 l 5)) (/.f64 (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 3) (*.f64 U U)))) (*.f64 (*.f64 1/8 (/.f64 (pow.f64 Om 3) n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))))) 2)) (*.f64 U (pow.f64 l 3)))))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 l U))))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) (*.f64 n U))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))) |
(fma.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) (*.f64 n U)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) 1/2))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))))) |
(fma.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))) 3))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) (*.f64 n U)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) 3))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 t t) -1)) -1/8)))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 (sqrt.f64 -1) 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3)))))))) |
(fma.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 (sqrt.f64 -1) 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))) 5)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))) 3)))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) (*.f64 n U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 t 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) 5)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) 3))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 t t) -1)) -1/8))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(fma.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (fma.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/16 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (*.f64 (sqrt.f64 2) (pow.f64 l 6))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/16 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 3) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 n (/.f64 t U))))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/16 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5)))))) (*.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))))))))) |
(*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))) |
(*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)))))) |
(*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) 1/2))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 3)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U)))) (fma.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) -1/8)))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))))) |
(fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 5)))) (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 3)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om))))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 t 3))) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 5))) (pow.f64 l 5))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U)))) (fma.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) -1/8))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) |
(neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om))))))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)))))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))))) |
(-.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) -1/2)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))) (*.f64 (*.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3)))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 3)))))) |
(-.f64 (fma.f64 (/.f64 (*.f64 1/8 (sqrt.f64 2)) (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 -1 (pow.f64 l 3))) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) -1/2))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) U)))) (fma.f64 -1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 5)))) (*.f64 (*.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3)))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) 3))))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 t l)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) U)))) (fma.f64 (/.f64 (*.f64 1/8 (sqrt.f64 2)) (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 -1 (pow.f64 l 3))) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 5))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (pow.f64 (sqrt.f64 -1) 5)) -1/16)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))) |
(-.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (neg.f64 (/.f64 l (sqrt.f64 -1)))) 2)) (*.f64 Om (sqrt.f64 2))) (*.f64 (sqrt.f64 -1) l)) (/.f64 (sqrt.f64 (/.f64 (/.f64 1 U) (-.f64 U U*))) n)) (-.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 3) l))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U U*) 3) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2))) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (*.f64 n n) (*.f64 l (pow.f64 (sqrt.f64 -1) 3)))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (neg.f64 (/.f64 l (sqrt.f64 -1)))) 2)) (*.f64 Om (sqrt.f64 2))) (*.f64 (sqrt.f64 -1) l)) (/.f64 (sqrt.f64 (/.f64 (/.f64 1 U) (-.f64 U U*))) n)) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om n) (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 (-.f64 U U*) 3)) U))) (/.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 (*.f64 l -1) (sqrt.f64 -1)))) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (neg.f64 (/.f64 l (sqrt.f64 -1)))) 2)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)) (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 t U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (*.f64 (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (sqrt.f64 (/.f64 1 (*.f64 U (*.f64 (pow.f64 t 3) n)))))) (pow.f64 Om 3)) (-.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 t U)))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 t U))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (*.f64 (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (sqrt.f64 (/.f64 1 (*.f64 U (*.f64 (pow.f64 t 3) n)))))) (pow.f64 Om 3)) (-.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t)))) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U U*)))) (neg.f64 (*.f64 n n))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (*.f64 (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) U))) 1/2))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (pow.f64 n 5) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 3) U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) U)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) U*) U*)) (pow.f64 Om 4)) (*.f64 (sqrt.f64 (/.f64 (pow.f64 n 5) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) 3) U))) -1/8)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 6) (*.f64 (pow.f64 l 6) (pow.f64 U* 3)))) (sqrt.f64 (/.f64 (pow.f64 n 7) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 5) U)))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (pow.f64 n 5) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 3) U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 6) (*.f64 (pow.f64 l 6) (pow.f64 U* 3)))) (sqrt.f64 (/.f64 (pow.f64 n 7) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) 5) U)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (pow.f64 l 4) U*) U*)) (pow.f64 Om 4)) (*.f64 (sqrt.f64 (/.f64 (pow.f64 n 5) (/.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) 3) U))) -1/8))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l))))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (*.f64 n U)) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))))) |
(*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)) (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))) |
(*.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 n (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 (*.f64 -2 (*.f64 n U)) (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l))))) |
(*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l))))) |
(*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 (*.f64 -2 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))) (*.f64 n (*.f64 l (*.f64 l U))) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 -4 n) (*.f64 l (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U*) Om)))) |
(*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U) |
(*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l)))))) |
(*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U)) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)) (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 (*.f64 n (*.f64 U* (*.f64 l l))) (*.f64 Om Om)) (*.f64 2 (/.f64 l (/.f64 Om l))))))) |
(-.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U)))) |
(*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) |
(neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l))))))) |
(*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))) (neg.f64 U)) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(+.f64 (*.f64 -1 (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U)) (*.f64 t U)) |
(fma.f64 t U (neg.f64 (*.f64 U (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (-.f64 U U*) (*.f64 l l)))))))) |
(*.f64 U (+.f64 t (neg.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U))) |
(neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l)))) |
(*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (neg.f64 (*.f64 l (*.f64 l U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U))) |
(neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l)))) |
(*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (neg.f64 (*.f64 l (*.f64 l U)))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(+.f64 (*.f64 t U) (*.f64 -1 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 t U (neg.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (*.f64 Om Om)) (/.f64 2 Om)) (*.f64 U (*.f64 l l))))) |
(-.f64 (*.f64 U t) (*.f64 U (*.f64 (*.f64 l l) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) |
(-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om)))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) |
(fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (*.f64 U t)) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 t U) |
(*.f64 U t) |
(+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) |
(fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) |
(fma.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)) (*.f64 U t)) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(+.f64 (*.f64 t U) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om)))) |
(fma.f64 t U (fma.f64 -1 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)) (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))) |
(fma.f64 U t (-.f64 (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))) (*.f64 U (*.f64 (/.f64 n Om) (/.f64 (*.f64 l (*.f64 l (-.f64 U U*))) Om))))) |
(*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) |
(*.f64 U (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l))))) |
(*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(+.f64 (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U) (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))) U (neg.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 U U*))) (*.f64 Om Om)))) |
(fma.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om))) |
(*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) |
(/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))) |
(/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)) |
(+.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))) (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(fma.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (/.f64 (*.f64 l l) (/.f64 Om U)) (/.f64 n Om)))) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) 1) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 1 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))))) (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))))) (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4)) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1/2)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 1/2) (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/2) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 3) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) 2) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(fabs.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1/2)) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1)) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 1) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (fma.f64 U U (*.f64 U* (+.f64 U U*))) (-.f64 (pow.f64 U 3) (pow.f64 U* 3)))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (-.f64 U U*) (+.f64 U U*))) (+.f64 U U*)) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (+.f64 U U*) (*.f64 (-.f64 U U*) (+.f64 U U*)))) |
(pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 1) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3) 1/3) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 (-.f64 U U*))) (sqrt.f64 n)) 2) |
(pow.f64 (*.f64 (/.f64 l Om) (*.f64 (sqrt.f64 (-.f64 U U*)) (sqrt.f64 n))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) |
(fabs.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) n)) |
(*.f64 n (log.f64 (pow.f64 (exp.f64 (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))) |
(*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (log.f64 (exp.f64 (-.f64 U U*))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)) 3)) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 1)) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) t) (*.f64 (*.f64 2 (*.f64 n U)) (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(+.f64 (*.f64 t (*.f64 2 (*.f64 n U))) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 (*.f64 n U)))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) 1) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3)))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 3))))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 2))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))) (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 2)))) |
(pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (sqrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 2) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (cbrt.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 3) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2) 1/2) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 2)) |
(fabs.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3) 1/3) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) (*.f64 2 n))) 2)) |
(fabs.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (pow.f64 (exp.f64 (*.f64 2 (*.f64 n U))) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 3)) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) (pow.f64 (*.f64 2 n) 3))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(expm1.f64 (log1p.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(exp.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n)))) 1)) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(log1p.f64 (expm1.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(+.f64 (*.f64 U t) (*.f64 U (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(+.f64 (*.f64 t U) (*.f64 (neg.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) U)) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) 1) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(/.f64 (*.f64 U (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 2)) (/.f64 (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) U)) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 2)) (/.f64 (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))) U)) |
(/.f64 (*.f64 (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 3)) U) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(/.f64 (*.f64 U (-.f64 (pow.f64 t 3) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 3))) (fma.f64 t t (*.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(/.f64 (*.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))) 2)) U) (+.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 2)) (/.f64 (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) U)) |
(/.f64 (-.f64 (*.f64 t t) (pow.f64 (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) 2)) (/.f64 (+.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))) U)) |
(pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 1) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(pow.f64 (cbrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 3) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(pow.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3) 1/3) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(pow.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 2) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(sqrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) 2)) |
(fabs.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(log.f64 (pow.f64 (exp.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) U)) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(cbrt.f64 (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))) 3)) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) 3) (pow.f64 U 3))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(expm1.f64 (log1p.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(exp.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) 1)) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
(log1p.f64 (expm1.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 U (-.f64 t (fma.f64 2 (/.f64 l (/.f64 Om l)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 87.8% | (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
| ✓ | 87.7% | (/.f64 (*.f64 l l) Om) |
| ✓ | 83.4% | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
| ✓ | 65.9% | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
Compiled 150 to 63 computations (58% saved)
57 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 2.0ms | n | @ | -inf | (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
| 1.0ms | t | @ | 0 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 1.0ms | U | @ | 0 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 1.0ms | n | @ | 0 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 1.0ms | U* | @ | inf | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 1× | batch-egg-rewrite |
| 962× | expm1-udef |
| 558× | add-sqr-sqrt |
| 550× | pow1 |
| 548× | *-un-lft-identity |
| 516× | add-exp-log |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 24 | 206 |
| 1 | 538 | 198 |
| 2 | 7654 | 198 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
(/.f64 (*.f64 l l) Om) |
(*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 n)) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f))) |
(((+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2))) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((+.f64 (*.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))) (*.f64 2 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) (*.f64 2 (*.f64 n U))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) (*.f64 2 (*.f64 n U))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((sqrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) 2) U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 3) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3) (pow.f64 (*.f64 2 (*.f64 n U)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((expm1.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log1p.f64 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 l (/.f64 l Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (*.f64 l l) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (*.f64 l (/.f64 l Om)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 l Om) l) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 1 (*.f64 l (/.f64 l Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (cbrt.f64 (pow.f64 l 4)) (*.f64 (pow.f64 (cbrt.f64 l) 2) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2) (cbrt.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 l (sqrt.f64 Om)) (/.f64 l (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (*.f64 l (neg.f64 l)) (/.f64 1 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 1 Om) (*.f64 l l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l l) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 l l) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 l 1) (/.f64 l Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 l (cbrt.f64 (*.f64 Om Om))) (/.f64 l (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) 1) (/.f64 (pow.f64 (cbrt.f64 l) 2) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (sqrt.f64 Om)) (/.f64 (pow.f64 (cbrt.f64 l) 2) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (*.f64 l (/.f64 l Om)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (/.f64 l (sqrt.f64 Om)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (/.f64 Om (*.f64 l l)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((neg.f64 (/.f64 (*.f64 l l) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((sqrt.f64 (/.f64 (pow.f64 l 4) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (exp.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 l (/.f64 l Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (/.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 Om 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((expm1.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (log.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 l (/.f64 l Om))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log1p.f64 (expm1.f64 (*.f64 l (/.f64 l Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f))) |
(((+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 U 3) (pow.f64 U* 3)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((/.f64 (*.f64 (*.f64 (+.f64 U U*) (-.f64 U U*)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (+.f64 U U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 n)) (sqrt.f64 (-.f64 U U*))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 n) (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) (/.f64 (*.f64 l l) Om) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) #f))) |
| 1× | egg-herbie |
| 1466× | associate-*r* |
| 1370× | associate-*l* |
| 894× | times-frac |
| 798× | fma-def |
| 622× | associate-/r* |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 690 | 26052 |
| 1 | 2115 | 25556 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 (sqrt.f64 -1) 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/16 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (*.f64 (sqrt.f64 2) (pow.f64 l 6))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 3) l))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U U*) 3) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (pow.f64 l 2) Om) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) 1) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4)) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2))) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))) (*.f64 2 (*.f64 n U)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) (*.f64 2 (*.f64 n U))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) (*.f64 2 (*.f64 n U))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 2) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3) 1/3) |
(sqrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) 2) U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 3) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3) (pow.f64 (*.f64 2 (*.f64 n U)) 3))) |
(expm1.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(exp.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) 1) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (*.f64 l l) (/.f64 1 Om)) |
(*.f64 (*.f64 l (/.f64 l Om)) 1) |
(*.f64 (/.f64 l Om) l) |
(*.f64 1 (*.f64 l (/.f64 l Om))) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (*.f64 (pow.f64 (cbrt.f64 l) 2) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2) (cbrt.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 (/.f64 l (sqrt.f64 Om)) (/.f64 l (sqrt.f64 Om))) |
(*.f64 (*.f64 l (neg.f64 l)) (/.f64 1 (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (*.f64 l l)) |
(*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l l) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 l l) (sqrt.f64 Om))) |
(*.f64 (/.f64 l 1) (/.f64 l Om)) |
(*.f64 (/.f64 l (cbrt.f64 (*.f64 Om Om))) (/.f64 l (cbrt.f64 Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) 1) (/.f64 (pow.f64 (cbrt.f64 l) 2) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (sqrt.f64 Om)) (/.f64 (pow.f64 (cbrt.f64 l) 2) (sqrt.f64 Om))) |
(pow.f64 (*.f64 l (/.f64 l Om)) 1) |
(pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 3) |
(pow.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3) 1/3) |
(pow.f64 (/.f64 l (sqrt.f64 Om)) 2) |
(pow.f64 (/.f64 Om (*.f64 l l)) -1) |
(neg.f64 (/.f64 (*.f64 l l) (neg.f64 Om))) |
(sqrt.f64 (/.f64 (pow.f64 l 4) (*.f64 Om Om))) |
(log.f64 (exp.f64 (*.f64 l (/.f64 l Om)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 l (/.f64 l Om))))) |
(cbrt.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 Om 3))) |
(expm1.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) |
(exp.f64 (log.f64 (*.f64 l (/.f64 l Om)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (/.f64 l Om))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 l (/.f64 l Om)))) |
(+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) |
(+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 1) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) |
(/.f64 (*.f64 (-.f64 (pow.f64 U 3) (pow.f64 U* 3)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 (+.f64 U U*) (-.f64 U U*)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (+.f64 U U*)) |
(pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 1) |
(pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3) |
(pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3) 1/3) |
(pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 n)) (sqrt.f64 (-.f64 U U*))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 n) (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 -1) l)) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 -1) l)) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*)))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (sqrt.f64 -1) l)) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (*.f64 (/.f64 (*.f64 (*.f64 n -1) (sqrt.f64 -1)) (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2)) (pow.f64 (/.f64 l Om) 3)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))))) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (sqrt.f64 (/.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 -1) l)) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 (sqrt.f64 -1) l)) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 (/.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 3) (pow.f64 l 5)) (/.f64 (pow.f64 Om 5) (pow.f64 (sqrt.f64 -1) 5)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3)))) (*.f64 (/.f64 (*.f64 (*.f64 n -1) (sqrt.f64 -1)) (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2)) (pow.f64 (/.f64 l Om) 3))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l (sqrt.f64 -2))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om)))) |
(-.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (*.f64 Om (sqrt.f64 -2))) l))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (sqrt.f64 -2)) (pow.f64 l 3)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))))) |
(-.f64 (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (*.f64 Om (sqrt.f64 -2))) l)) (*.f64 (/.f64 (*.f64 1/8 (*.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2)))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 3) (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) (sqrt.f64 -2))) l) (sqrt.f64 (/.f64 U (-.f64 U U*))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) 2) (sqrt.f64 -2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))) (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 3) (sqrt.f64 -2)) (pow.f64 l 5)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))) (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (sqrt.f64 -2)) (pow.f64 l 3)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om)))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 5))) (/.f64 (pow.f64 Om 5) (*.f64 (/.f64 (*.f64 n n) (sqrt.f64 -2)) (/.f64 (pow.f64 l 5) (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 3))))) (-.f64 (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (*.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) (*.f64 Om (sqrt.f64 -2))) l)) (*.f64 (/.f64 (*.f64 1/8 (*.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2) (*.f64 (pow.f64 Om 3) (sqrt.f64 -2)))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U U*) 3))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U U*))) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))) l)))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))))) l)) (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))) l)) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3)))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))))) l)) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 2) (*.f64 U (pow.f64 l 3)))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) (*.f64 (sqrt.f64 -1) l))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))) l)) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (*.f64 U U))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 Om (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))))) l)) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 2) (*.f64 U (pow.f64 l 3))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 5)) (*.f64 n n)) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 3) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 U (*.f64 U (pow.f64 l 5)))))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(neg.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -2)))) Om)) |
(/.f64 (neg.f64 n) (/.f64 (/.f64 Om (*.f64 U (sqrt.f64 -2))) l)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -2)))) Om) (*.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))))))) |
(-.f64 (*.f64 1/2 (/.f64 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 (sqrt.f64 -2) Om)) l)) (/.f64 n (/.f64 (/.f64 Om (*.f64 U (sqrt.f64 -2))) l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U)))))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -2)))) Om) (fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 2)) (*.f64 U (pow.f64 l 3))))))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 (sqrt.f64 -2) Om)) l) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (*.f64 (/.f64 (sqrt.f64 -2) U) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 2) (pow.f64 l 3)))))) (/.f64 n (/.f64 (/.f64 Om (*.f64 U (sqrt.f64 -2))) l))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))))) l)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 5) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 5) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) 2))) (*.f64 n (*.f64 (pow.f64 l 3) U))))))) |
(fma.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -2)))) Om) (fma.f64 1/2 (/.f64 Om (/.f64 l (*.f64 (sqrt.f64 -2) (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 Om 5) (*.f64 n n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 3)) (*.f64 (pow.f64 l 5) (*.f64 U U)))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))) 2)) (*.f64 U (pow.f64 l 3)))))))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 (sqrt.f64 -2) Om)) l) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 (pow.f64 Om 5) (sqrt.f64 -2)) (*.f64 n (*.f64 n (pow.f64 l 5)))) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 3) (*.f64 U U))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 Om 3) n) (*.f64 (/.f64 (sqrt.f64 -2) U) (/.f64 (pow.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) 2) (pow.f64 l 3))))))) (/.f64 n (/.f64 (/.f64 Om (*.f64 U (sqrt.f64 -2))) l))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))))) (fma.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))) 3)))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) U)))) (fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) (*.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 t t) -1)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) 3) U))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 (sqrt.f64 -1) 5)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) 3))))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)))))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 t 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))) 5)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) t)) (sqrt.f64 (/.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))))) (fma.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (pow.f64 (sqrt.f64 -1) 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))) 3)))) (*.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 -1)) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 t 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) 5)))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) U)))) (fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (sqrt.f64 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) (*.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 (*.f64 t t) -1)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) 3) U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1/16 (*.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (*.f64 (sqrt.f64 2) (pow.f64 l 6))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/2 (*.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 (sqrt.f64 2) (pow.f64 l 2))) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/16 (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 3) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 5) U))))) (*.f64 -1/2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (sqrt.f64 (/.f64 (*.f64 n U) t)))))))) |
(fma.f64 -1/8 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 2) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1/2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))))) (*.f64 -1/16 (*.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))))))) |
(*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))) |
(*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)))))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 3)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)) (fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))) (*.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) U))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (*.f64 (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)))))) |
(fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 5)))) (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 3)))) (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om))))))))) |
(fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (/.f64 (pow.f64 t 3) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 5)))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)) (fma.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))) (*.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) U)))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) |
(neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om))))))) |
(*.f64 (sqrt.f64 2) (neg.f64 (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)))))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))))) |
(fma.f64 (*.f64 (*.f64 (sqrt.f64 -1) (neg.f64 l)) (sqrt.f64 2)) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3)))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 3)))))) |
(-.f64 (fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n U))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 (sqrt.f64 -1) l) (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) U)))) (fma.f64 -1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 5)))) (*.f64 (*.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3)))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) 3))))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 -1)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))) l)) (fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 3) U)))) (*.f64 -1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (/.f64 (pow.f64 t 3) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) 5))))))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (*.f64 n U) (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))) |
(-.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*))))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)))))) |
(-.f64 (fma.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) l)) Om) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (neg.f64 l) (sqrt.f64 -1))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (*.f64 U (-.f64 U U*)))) Om)) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U U*) U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) l))) Om) (sqrt.f64 (*.f64 (-.f64 U U*) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 (/.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*))))) 2)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 3) l))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U U*) 3) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U U*)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*))))) (*.f64 n (*.f64 (sqrt.f64 -1) l))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 l (sqrt.f64 -1)))) 2))) (*.f64 (*.f64 n n) (*.f64 l (pow.f64 (sqrt.f64 -1) 3)))) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U U*) 3))))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (neg.f64 l) (sqrt.f64 -1))) 2)))) n) (/.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U U*)))) (*.f64 (sqrt.f64 -1) l))) (-.f64 (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (sqrt.f64 (*.f64 U (-.f64 U U*))) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U U*) 3)))) (*.f64 (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (neg.f64 l) (sqrt.f64 -1))) 2)) (*.f64 (*.f64 Om Om) (sqrt.f64 2)))) (*.f64 (*.f64 n n) (*.f64 (sqrt.f64 -1) (neg.f64 l)))))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) l))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t))))) (*.f64 Om Om)) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t))))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (-.f64 (*.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) (pow.f64 t 3)))) (pow.f64 Om 3))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t))))) (*.f64 Om Om)) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 -1 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U)))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l l) (-.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l)))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 (*.f64 n U) t)))) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2)) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 1 n) (*.f64 U t))))) (*.f64 Om Om)) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (-.f64 (*.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (-.f64 (*.f64 (neg.f64 (*.f64 (*.f64 n n) (*.f64 l l))) (*.f64 U (-.f64 U U*))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U)))) 2))) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) U) (pow.f64 t 3)))) (pow.f64 Om 3))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))))) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 3)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) U)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 U* 3))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 U* 2))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (pow.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 6) (*.f64 (pow.f64 l 6) (pow.f64 U* 3)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 7)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 5)))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))) 3)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))) (/.f64 U* Om)) (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 6) (*.f64 (pow.f64 l 6) (pow.f64 U* 3)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 7)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) 5)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 5)) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))))) 3)))))))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2)))))) |
(*.f64 (*.f64 n U) (*.f64 2 (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (*.f64 2 (/.f64 (pow.f64 l 2) Om))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 n (*.f64 U (fma.f64 l (*.f64 (/.f64 l Om) -2) t))) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om)))))))) |
(*.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (*.f64 2 (/.f64 (pow.f64 l 2) Om)))) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (*.f64 2 (*.f64 l (/.f64 l Om))))))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (-.f64 t (-.f64 (*.f64 2 (*.f64 l (/.f64 l Om))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om)))) (*.f64 n U)) (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) |
(*.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om))))) |
(*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(+.f64 (*.f64 -2 (*.f64 n (*.f64 (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2))) U))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(fma.f64 -2 (*.f64 (*.f64 n U) (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)))) (*.f64 2 (*.f64 n (*.f64 U t)))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om))) (*.f64 n U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l))))) |
(*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l))))) |
(*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (*.f64 (+.f64 (/.f64 (*.f64 n (-.f64 U U*)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -2 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 l l) (*.f64 n U))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2)))) |
(fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om)))) |
(fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 U t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om) (*.f64 (*.f64 n U) (*.f64 2 t))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U U*) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U U*)) (*.f64 l l))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 U t)) (fma.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U (-.f64 U U*)) Om)) (*.f64 -4 (/.f64 (*.f64 (*.f64 l l) (*.f64 n U)) Om)))) |
(*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))))))) |
(*.f64 2 (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om))) |
(*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om))) |
(*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (-.f64 t (+.f64 (*.f64 2 (/.f64 (pow.f64 l 2) Om)) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U*))) (*.f64 Om Om)) (*.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)))))))) |
(*.f64 2 (fma.f64 n (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (pow.f64 l 2) Om) |
(*.f64 l (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U U*))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 (-.f64 U U*) (*.f64 l l))) (*.f64 Om Om)) |
(*.f64 (/.f64 n Om) (/.f64 (*.f64 (-.f64 U U*) (*.f64 l l)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* n))) (*.f64 Om Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)) |
(/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om)) |
(/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* n))) (*.f64 Om Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) |
(neg.f64 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* n))) (*.f64 Om Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U*)) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))) |
(fma.f64 -1 (/.f64 n (/.f64 (*.f64 Om Om) (*.f64 U* (*.f64 l l)))) (/.f64 (*.f64 n (*.f64 U (*.f64 l l))) (*.f64 Om Om))) |
(-.f64 (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om U))) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 Om Om))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4)) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (pow.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(*.f64 (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(*.f64 (pow.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 2))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))))) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/2) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 3) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1/4) 2) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1/2)) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1)) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(+.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2))) (*.f64 (*.f64 2 (*.f64 n U)) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(+.f64 (*.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 2 (*.f64 n U))) (*.f64 (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))) (*.f64 2 (*.f64 n U)))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) 1) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (+.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (*.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) (+.f64 t (+.f64 (*.f64 l (*.f64 (/.f64 l Om) -2)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) (-.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 3) (pow.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) 3)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 3) (pow.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) 3)))) (fma.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) (*.f64 n (fma.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2) (fma.f64 l (*.f64 (/.f64 l Om) -2) t)))) (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2))) |
(/.f64 (*.f64 (*.f64 2 (*.f64 n U)) (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (+.f64 t (+.f64 (*.f64 l (*.f64 (/.f64 l Om) -2)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))) (-.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (pow.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) 2)))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (fma.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2) (fma.f64 l (*.f64 (/.f64 l Om) -2) t)) (-.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2) (pow.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) 2)))) |
(/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 3) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) (*.f64 2 (*.f64 n U))) (+.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (*.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (+.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (*.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) (+.f64 t (+.f64 (*.f64 l (*.f64 (/.f64 l Om) -2)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) (-.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 3) (pow.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) 3)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 3) (pow.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) 3)))) (fma.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) (*.f64 n (fma.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2) (fma.f64 l (*.f64 (/.f64 l Om) -2) t)))) (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2))) |
(/.f64 (*.f64 (-.f64 (pow.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) 2) (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) (*.f64 2 (*.f64 n U))) (+.f64 (+.f64 t (*.f64 (*.f64 l (/.f64 l Om)) -2)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (+.f64 t (+.f64 (*.f64 l (*.f64 (/.f64 l Om) -2)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))) (-.f64 (pow.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) 2) (pow.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) 2)))) |
(/.f64 (*.f64 2 (*.f64 n U)) (/.f64 (fma.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2) (fma.f64 l (*.f64 (/.f64 l Om) -2) t)) (-.f64 (pow.f64 (fma.f64 l (*.f64 (/.f64 l Om) -2) t) 2) (pow.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) 2)))) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 1) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 2) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 3) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2) 1/2) |
(sqrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 2)) |
(fabs.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3) 1/3) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(sqrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))))) 2)) |
(fabs.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))))))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) 2) U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) |
(*.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)))) (log.f64 (pow.f64 (pow.f64 (exp.f64 n) 2) U))) |
(*.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))) (*.f64 U (log.f64 (pow.f64 (exp.f64 n) 2)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) 3)) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 (*.f64 n U)) 3) (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 3) (pow.f64 (*.f64 2 (*.f64 n U)) 3))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(expm1.f64 (log1p.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(exp.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))))) 1)) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(log1p.f64 (expm1.f64 (*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))))) |
(*.f64 (*.f64 2 (*.f64 n U)) (+.f64 (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))) (*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (neg.f64 n))))) |
(*.f64 2 (*.f64 (*.f64 n U) (-.f64 t (fma.f64 2 (*.f64 l (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) 1) |
(*.f64 l (/.f64 l Om)) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (*.f64 l l) (/.f64 1 Om)) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (*.f64 l (/.f64 l Om)) 1) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (/.f64 l Om) l) |
(*.f64 l (/.f64 l Om)) |
(*.f64 1 (*.f64 l (/.f64 l Om))) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (*.f64 (pow.f64 (cbrt.f64 l) 2) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (*.f64 (/.f64 1 Om) (pow.f64 (cbrt.f64 l) 2))) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (/.f64 (pow.f64 (cbrt.f64 l) 2) Om)) |
(*.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2)) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 2) (cbrt.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (/.f64 l (sqrt.f64 Om)) (/.f64 l (sqrt.f64 Om))) |
(pow.f64 (/.f64 l (sqrt.f64 Om)) 2) |
(*.f64 (*.f64 l (neg.f64 l)) (/.f64 1 (neg.f64 Om))) |
(/.f64 (neg.f64 l) (/.f64 (neg.f64 Om) l)) |
(*.f64 (/.f64 1 Om) (*.f64 l l)) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l l) (cbrt.f64 Om))) |
(*.f64 (/.f64 l (cbrt.f64 (*.f64 Om Om))) (/.f64 l (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 l l) (sqrt.f64 Om))) |
(pow.f64 (/.f64 l (sqrt.f64 Om)) 2) |
(*.f64 (/.f64 l 1) (/.f64 l Om)) |
(*.f64 l (/.f64 l Om)) |
(*.f64 (/.f64 l (cbrt.f64 (*.f64 Om Om))) (/.f64 l (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l l) (cbrt.f64 Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) 1) (/.f64 (pow.f64 (cbrt.f64 l) 2) Om)) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (*.f64 (/.f64 1 Om) (pow.f64 (cbrt.f64 l) 2))) |
(*.f64 (cbrt.f64 (pow.f64 l 4)) (/.f64 (pow.f64 (cbrt.f64 l) 2) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) (/.f64 (cbrt.f64 (pow.f64 l 4)) (cbrt.f64 (*.f64 Om Om)))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 l 4)) (sqrt.f64 Om)) (/.f64 (pow.f64 (cbrt.f64 l) 2) (sqrt.f64 Om))) |
(pow.f64 (*.f64 l (/.f64 l Om)) 1) |
(*.f64 l (/.f64 l Om)) |
(pow.f64 (cbrt.f64 (*.f64 l (/.f64 l Om))) 3) |
(*.f64 l (/.f64 l Om)) |
(pow.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3) 1/3) |
(*.f64 l (/.f64 l Om)) |
(pow.f64 (/.f64 l (sqrt.f64 Om)) 2) |
(pow.f64 (/.f64 Om (*.f64 l l)) -1) |
(/.f64 1 (/.f64 Om (*.f64 l l))) |
(neg.f64 (/.f64 (*.f64 l l) (neg.f64 Om))) |
(*.f64 (*.f64 l (neg.f64 l)) (/.f64 1 (neg.f64 Om))) |
(/.f64 (neg.f64 l) (/.f64 (neg.f64 Om) l)) |
(sqrt.f64 (/.f64 (pow.f64 l 4) (*.f64 Om Om))) |
(log.f64 (exp.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 l (/.f64 l Om)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 l (/.f64 l Om))))) |
(*.f64 l (/.f64 l Om)) |
(cbrt.f64 (pow.f64 (*.f64 l (/.f64 l Om)) 3)) |
(*.f64 l (/.f64 l Om)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 Om 3))) |
(*.f64 l (/.f64 l Om)) |
(expm1.f64 (log1p.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 l (/.f64 l Om)) |
(exp.f64 (log.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 l (/.f64 l Om)) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (/.f64 l Om))) 1)) |
(*.f64 l (/.f64 l Om)) |
(log1p.f64 (expm1.f64 (*.f64 l (/.f64 l Om)))) |
(*.f64 l (/.f64 l Om)) |
(+.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) U) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (neg.f64 U*))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(+.f64 (*.f64 U (*.f64 n (pow.f64 (/.f64 l Om) 2))) (*.f64 (neg.f64 U*) (*.f64 n (pow.f64 (/.f64 l Om) 2)))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) 1) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (*.f64 (+.f64 U U*) (-.f64 U U*))) (+.f64 U U*)) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (+.f64 U U*) (*.f64 (-.f64 U U*) (+.f64 U U*)))) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (/.f64 (+.f64 U U*) (-.f64 U U*)) (+.f64 U U*))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U 3) (pow.f64 U* 3)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 (pow.f64 U 3) (pow.f64 U* 3))) (fma.f64 U U (*.f64 U* (+.f64 U U*)))) |
(/.f64 (*.f64 (*.f64 (+.f64 U U*) (-.f64 U U*)) (*.f64 n (pow.f64 (/.f64 l Om) 2))) (+.f64 U U*)) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (+.f64 U U*) (*.f64 (-.f64 U U*) (+.f64 U U*)))) |
(/.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (/.f64 (/.f64 (+.f64 U U*) (-.f64 U U*)) (+.f64 U U*))) |
(pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 1) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 3) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3) 1/3) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(pow.f64 (*.f64 (*.f64 (/.f64 l Om) (sqrt.f64 n)) (sqrt.f64 (-.f64 U U*))) 2) |
(pow.f64 (/.f64 (*.f64 (*.f64 l (sqrt.f64 n)) (sqrt.f64 (-.f64 U U*))) Om) 2) |
(sqrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) 2)) |
(fabs.f64 (*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2)))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 n) (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))) |
(*.f64 (-.f64 U U*) (log.f64 (pow.f64 (exp.f64 n) (pow.f64 (/.f64 l Om) 2)))) |
(*.f64 (-.f64 U U*) (*.f64 (pow.f64 (/.f64 l Om) 2) (log.f64 (exp.f64 n)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(cbrt.f64 (pow.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))) 3)) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(expm1.f64 (log1p.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(exp.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*)))) 1)) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
(log1p.f64 (expm1.f64 (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))) |
(*.f64 (*.f64 n (-.f64 U U*)) (pow.f64 (/.f64 l Om) 2)) |
(*.f64 n (*.f64 (-.f64 U U*) (pow.f64 (/.f64 l Om) 2))) |
Compiled 51894 to 24998 computations (51.8% saved)
46 alts after pruning (46 fresh and 0 done)
| Pruned | Kept | Total | |
|---|---|---|---|
| New | 1071 | 46 | 1117 |
| Fresh | 0 | 0 | 0 |
| Picked | 1 | 0 | 1 |
| Done | 2 | 0 | 2 |
| Total | 1074 | 46 | 1120 |
| Status | Accuracy | Program |
|---|---|---|
| 5.7% | (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))))) | |
| 6.2% | (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) | |
| 47.0% | (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) | |
| 42.4% | (pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) 2) | |
| 6.3% | (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) | |
| 5.5% | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) | |
| 7.7% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) | |
| 10.5% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) | |
| 31.0% | (*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) | |
| 26.6% | (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) | |
| 29.3% | (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) | |
| 25.4% | (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) | |
| ▶ | 13.5% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
| 42.8% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) | |
| 36.7% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) | |
| 41.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) | |
| ▶ | 4.7% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
| 14.1% | (sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) | |
| 8.0% | (sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) | |
| 13.3% | (sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) | |
| 38.6% | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) | |
| 34.8% | (sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) | |
| 43.0% | (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) | |
| ▶ | 14.7% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
| 12.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) | |
| 4.7% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) | |
| 2.1% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) | |
| 5.9% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) | |
| 6.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) | |
| 43.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) | |
| 6.2% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) | |
| ▶ | 36.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 42.4% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) | |
| 40.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) | |
| 2.4% | (sqrt.f64 (*.f64 (*.f64 2 n) (log.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) | |
| ▶ | 48.6% | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 4.9% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) | |
| 45.8% | (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) | |
| 10.6% | (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) | |
| 42.4% | (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) | |
| 4.7% | (sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) | |
| 10.4% | (sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) | |
| 9.6% | (sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) | |
| 2.1% | (sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) | |
| 6.2% | (sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) | |
| 2.6% | (sqrt.f64 (log.f64 (pow.f64 (exp.f64 (*.f64 2 (*.f64 n U))) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
Compiled 2572 to 1718 computations (33.2% saved)
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 90.1% | (*.f64 n (*.f64 U t)) |
| ✓ | 89.5% | (*.f64 (*.f64 n l) (-.f64 U* U)) |
| ✓ | 89.5% | (*.f64 n (*.f64 l U)) |
| ✓ | 65.9% | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
Compiled 182 to 46 computations (74.7% saved)
48 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 6.0ms | t | @ | -inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 4.0ms | U* | @ | 0 | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 3.0ms | U | @ | 0 | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 3.0ms | n | @ | 0 | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 2.0ms | U | @ | -inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 1× | batch-egg-rewrite |
| 608× | add-sqr-sqrt |
| 596× | pow1 |
| 596× | *-un-lft-identity |
| 560× | add-exp-log |
| 560× | add-log-exp |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 26 | 126 |
| 1 | 583 | 126 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 n (*.f64 l U)) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 U t)) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) (sqrt.f64 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (*.f64 n (*.f64 U l)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 U l))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 U l))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 U) l) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 U l) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 U 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U l) 3) (pow.f64 n 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 U l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U l))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 U l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f))) |
(((+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 U l) (neg.f64 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (pow.f64 (exp.f64 (-.f64 U* U)) (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (-.f64 U* U) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (*.f64 n l) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (*.f64 n (*.f64 U t)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 U t))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 U t))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 U) t) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 U t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U t))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 U t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 n (*.f64 l U)) (*.f64 (*.f64 n l) (-.f64 U* U)) (*.f64 n (*.f64 U t))) #f))) |
| 1× | egg-herbie |
| 1354× | associate-*r* |
| 1200× | associate-*l* |
| 1028× | times-frac |
| 752× | associate-/l* |
| 740× | associate-/r* |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 605 | 14507 |
| 1 | 1890 | 14177 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3))))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2) (pow.f64 Om 3))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 3) (pow.f64 Om 5))) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2) (pow.f64 Om 3))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 2))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 3))) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 2))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 5) (pow.f64 l 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 2) (pow.f64 l 4))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3) (pow.f64 l 6))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 2) (pow.f64 l 4))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 5)))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 6) (*.f64 (pow.f64 l 6) (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) (pow.f64 Om 6))) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 t U)) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(*.f64 (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) (sqrt.f64 2)) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) |
(pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 3) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) 1) |
(pow.f64 (*.f64 n (*.f64 U l)) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U l))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U l))) 2) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) l) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U l))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 U l) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 U 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U l) 3) (pow.f64 n 3))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U l)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U l))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U l)))) |
(+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 U l) (neg.f64 n))) |
(+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) 1) |
(pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 1) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 3) |
(pow.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 2) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 2)) |
(log.f64 (pow.f64 (exp.f64 (-.f64 U* U)) (*.f64 n l))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)))) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (-.f64 U* U) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (*.f64 n l) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(exp.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) 1) |
(pow.f64 (*.f64 n (*.f64 U t)) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U t))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U t))) 2) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) t) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U t))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U t)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U t))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U t)))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))))) |
(fma.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 l (*.f64 Om (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U)))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3))))) (*.f64 n (pow.f64 l 3)))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U)))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U))))) 2)) (/.f64 n (sqrt.f64 2))) (/.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (pow.f64 l 3)))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3))))))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (fma.f64 1/16 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5))))) (*.f64 (*.f64 n n) (pow.f64 l 5))) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3))))) (*.f64 n (pow.f64 l 3))))))) |
(fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U)))))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U))))) (fma.f64 -1/8 (*.f64 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U))))) 2)) (/.f64 n (sqrt.f64 2))) (/.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (pow.f64 l 3))) (*.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 (/.f64 (pow.f64 (fma.f64 U t (*.f64 -2 (/.f64 l (/.f64 Om (*.f64 l U))))) 3) (/.f64 (pow.f64 l 5) (pow.f64 Om 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(/.f64 (neg.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) Om) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))))))) (neg.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om))) |
(-.f64 (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))))) l)) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (pow.f64 l 3)))) (neg.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))))) l) (fma.f64 (*.f64 (*.f64 1/8 (/.f64 (sqrt.f64 2) n)) (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 2) (/.f64 (pow.f64 l 3) (pow.f64 Om 3)))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (/.f64 (neg.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) Om))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))) (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 3)) (pow.f64 l 5)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))))))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (pow.f64 l 3)))) (neg.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 5) (pow.f64 U 5)))) (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (pow.f64 Om 5) (/.f64 (pow.f64 l 5) (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 3))))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))))) l) (fma.f64 (*.f64 (*.f64 1/8 (/.f64 (sqrt.f64 2) n)) (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 2) (/.f64 (pow.f64 l 3) (pow.f64 Om 3)))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 U 3)))) (/.f64 (neg.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) Om)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (/.f64 (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) n)) (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2) (pow.f64 Om 3))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3)))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (/.f64 (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) n)) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (*.f64 (sqrt.f64 -1) (*.f64 U (pow.f64 l 3))))) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (pow.f64 n 3)))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 3) (pow.f64 Om 5))) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) Om)) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (*.f64 n t) (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2) (pow.f64 Om 3))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U)))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 5)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (*.f64 U U))))) (fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 5)) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) 3) (*.f64 (pow.f64 l 5) (*.f64 U U))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (/.f64 (*.f64 Om (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) n)) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (*.f64 (sqrt.f64 -1) (*.f64 U (pow.f64 l 3))))) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) 2)) (pow.f64 n 3))))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))))) |
(/.f64 (neg.f64 (sqrt.f64 2)) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 Om (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)))) (*.f64 l (sqrt.f64 -1)))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))))) |
(-.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) Om) (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))))) (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 2))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 Om (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)))) (*.f64 l (sqrt.f64 -1)))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))))))) |
(-.f64 (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 U (pow.f64 l 3))) (/.f64 (pow.f64 (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) 2) (*.f64 -1 (sqrt.f64 -1))))) (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) Om) (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))))))) (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 3))) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (pow.f64 U 2)))))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))) 2))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 (pow.f64 l 3) U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)) (*.f64 -1 (*.f64 n t))))) (*.f64 n (*.f64 (sqrt.f64 -1) l)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(fma.f64 1/16 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 5) (*.f64 U U)))) (*.f64 (pow.f64 Om 5) (pow.f64 (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))) 3)))) (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om))) 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 U (pow.f64 l 3))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 Om (*.f64 -1 (fma.f64 n t (/.f64 (*.f64 n (*.f64 l (fma.f64 -2 l (/.f64 (*.f64 n (*.f64 l U*)) Om)))) Om)))) (*.f64 l (sqrt.f64 -1)))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 5)) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) 3) (*.f64 (pow.f64 l 5) (*.f64 U U))))) (-.f64 (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 n 3)) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 U (pow.f64 l 3))) (/.f64 (pow.f64 (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) 2) (*.f64 -1 (sqrt.f64 -1))))) (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -1))) Om) (neg.f64 (fma.f64 n t (/.f64 (*.f64 n l) (/.f64 Om (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))))))) (/.f64 (sqrt.f64 2) (/.f64 (/.f64 Om (sqrt.f64 -1)) (*.f64 n (*.f64 l U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) (/.f64 Om (*.f64 n (*.f64 l U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)))) |
(fma.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U)))))) (/.f64 (*.f64 Om U) l)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))) (*.f64 1/2 (*.f64 t (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U))))) (/.f64 Om (/.f64 l U)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U)))))) (/.f64 (*.f64 Om U) l)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) (/.f64 Om (*.f64 n (*.f64 l U))))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) 3)) (/.f64 (*.f64 U (pow.f64 Om 3)) (pow.f64 l 3)))))))) |
(fma.f64 1/2 (*.f64 t (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U))))) (/.f64 Om (/.f64 l U)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))) (*.f64 -1/8 (*.f64 (*.f64 t t) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) 3)) (/.f64 U (/.f64 (pow.f64 l 3) (pow.f64 Om 3)))))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) l))))) (+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 5) (pow.f64 l 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (*.f64 (/.f64 n (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U)))))) (/.f64 (*.f64 Om U) l)))) (fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 5))) (*.f64 (pow.f64 l 5) (pow.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) 5)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) (/.f64 Om (*.f64 n (*.f64 l U))))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (/.f64 n (/.f64 Om (*.f64 l (-.f64 U* U))))) 3)) (/.f64 (*.f64 U (pow.f64 Om 3)) (pow.f64 l 3))))))))) |
(fma.f64 1/2 (*.f64 t (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U))))) (/.f64 Om (/.f64 l U)))))) (fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) 5)) (/.f64 (*.f64 U (pow.f64 Om 5)) (pow.f64 l 5)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))) (*.f64 -1/8 (*.f64 (*.f64 t t) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) 3)) (/.f64 U (/.f64 (pow.f64 l 3) (pow.f64 Om 3))))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 l l) (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) (sqrt.f64 (/.f64 n (/.f64 t U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) |
(fma.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 Om (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))))) (sqrt.f64 (/.f64 n (/.f64 t U))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 2) (pow.f64 l 4))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 l l) (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) (sqrt.f64 (/.f64 n (/.f64 t U)))) (fma.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U)))) (*.f64 Om Om)) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))))) (sqrt.f64 (/.f64 n (/.f64 t U)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 2) (*.f64 (pow.f64 l 4) (sqrt.f64 2))) Om) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))) Om))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (pow.f64 l 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3) (pow.f64 l 6))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 2) (pow.f64 l 4))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 l l) (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) (sqrt.f64 (/.f64 n (/.f64 t U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3) (pow.f64 l 6)))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 5) U)))) (fma.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 2) (pow.f64 l 4))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U)))) (*.f64 Om Om)) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))))) (sqrt.f64 (/.f64 n (/.f64 t U)))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3)) (pow.f64 l 6))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 5) U)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 2) (*.f64 (pow.f64 l 4) (sqrt.f64 2))) Om) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))) Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2)))))) |
(fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 Om U))))))) |
(fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 (*.f64 Om U) (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) n)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3)))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 Om U)))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3) (*.f64 U (pow.f64 Om 3)))))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 (*.f64 Om U) (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) n))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 3))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) 5)))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3)))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 Om U))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 5))) (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 5)))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 3) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 3) (*.f64 U (pow.f64 Om 3)))))) (fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 (*.f64 Om U) (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) n)))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) 5) (*.f64 U (pow.f64 Om 5)))))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) |
(neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))))) |
(*.f64 (sqrt.f64 2) (neg.f64 (*.f64 l (*.f64 (sqrt.f64 -1) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 Om U))))))) |
(-.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (/.f64 t (sqrt.f64 -1)))) (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 Om U)))))) (*.f64 (sqrt.f64 2) (*.f64 l (*.f64 (sqrt.f64 -1) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 Om U))))) (*.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3))))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (/.f64 t (sqrt.f64 -1)))) (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 Om U))))) (*.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 Om 3)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 3) n)))))) (*.f64 (sqrt.f64 2) (*.f64 l (*.f64 (sqrt.f64 -1) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 5))))) (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 Om U))))) (fma.f64 -1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 5)) (/.f64 (pow.f64 t 3) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 5))) (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 5)))) (*.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 (sqrt.f64 -1) 3)) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3)))))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (/.f64 t (sqrt.f64 -1)))) (sqrt.f64 (/.f64 n (/.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 Om U))))) (fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (*.f64 t t) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 Om 3)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 3) n)))) (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (/.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 5))) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 5))) (pow.f64 (sqrt.f64 -1) 5)))))) (*.f64 (sqrt.f64 2) (*.f64 l (*.f64 (sqrt.f64 -1) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om))))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n n)) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U* U))) Om)) (sqrt.f64 (/.f64 1 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U U) (*.f64 U* U*)))))) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t))) 3)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n n)) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U* U))) Om)) (sqrt.f64 (/.f64 1 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))) (*.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U (*.f64 U (*.f64 U* U*))) (pow.f64 n 4))))) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om))))))) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 6) (*.f64 (pow.f64 l 6) (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))) (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) (*.f64 n (*.f64 t U))) (pow.f64 Om 6))) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U))) 3))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om) (*.f64 n (*.f64 t U)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) (sqrt.f64 (/.f64 1 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U U) (*.f64 U* U*)))))) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t))) 3)))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t))) 3))) (*.f64 (/.f64 (sqrt.f64 2) (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))) (/.f64 (*.f64 (pow.f64 n 6) (*.f64 (pow.f64 l 6) (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))) (pow.f64 Om 6)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) (*.f64 n (*.f64 U t)))))))) |
(+.f64 (*.f64 (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om))))))) 3))) (+.f64 (*.f64 -1/8 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U (*.f64 U (*.f64 U* U*))) (pow.f64 n 4)))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 n 6)) (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))) (/.f64 (*.f64 (pow.f64 U 3) (*.f64 (pow.f64 U* 3) (pow.f64 l 6))) (pow.f64 Om 6)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om)))))))) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n n)) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U* U))) Om)) (sqrt.f64 (/.f64 1 (fma.f64 n (*.f64 U t) (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 (*.f64 U (*.f64 l (neg.f64 n))) Om))))))))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(-.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2))) l))) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om))) |
(fma.f64 (*.f64 (*.f64 1/2 (/.f64 (sqrt.f64 2) n)) (/.f64 Om (/.f64 l (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 l (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (-.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 (-.f64 U* U) U))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 (-.f64 U* U) 3) U)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 Om (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2))) l))) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (*.f64 Om Om) (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2))) l)) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U* U) 3))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 Om (/.f64 l (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 l (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)))))) (-.f64 (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) l) (/.f64 (-.f64 (*.f64 n (*.f64 U t)) (pow.f64 (*.f64 l (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))))) 2)) (*.f64 n n))) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 (-.f64 U* U) 3))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (*.f64 Om Om))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (*.f64 Om Om)))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) (pow.f64 t 3)) U))) (/.f64 (/.f64 (pow.f64 Om 3) (*.f64 l l)) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (*.f64 Om Om))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U (pow.f64 t 3)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t))))) (*.f64 Om Om)))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 (/.f64 1 n) (pow.f64 t 3)) U))) (/.f64 (/.f64 (pow.f64 Om 3) (*.f64 l l)) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 n (*.f64 l (*.f64 n l)))) (pow.f64 (*.f64 l (*.f64 l (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 U t)))))) (-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U t)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (*.f64 l l) (/.f64 Om (sqrt.f64 2))))))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 U (*.f64 l (neg.f64 n))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 U (*.f64 l (neg.f64 n))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 U (*.f64 l (neg.f64 n))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(*.f64 n (*.f64 t U)) |
(*.f64 n (*.f64 U t)) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) 1) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) (sqrt.f64 2)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4)) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U)))))))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U)))))))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))))) |
(pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/2) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 3) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U))))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U)))))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 1/4) 2) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U))))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U)))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))) 1/2)) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om)))))) 1)) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 (*.f64 n (*.f64 U l)) Om))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 n (*.f64 U t) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 n l) (/.f64 Om (-.f64 U* U)))) (/.f64 n (/.f64 Om (*.f64 l U))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) 1) |
(*.f64 n (*.f64 l U)) |
(pow.f64 (*.f64 n (*.f64 U l)) 1) |
(*.f64 n (*.f64 l U)) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U l))) 3) |
(*.f64 n (*.f64 l U)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3) 1/3) |
(*.f64 n (*.f64 l U)) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U l))) 2) |
(*.f64 n (*.f64 l U)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 2)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l U)) 2)) |
(fabs.f64 (*.f64 n (*.f64 l U))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) l) n)) |
(*.f64 n (log.f64 (pow.f64 (exp.f64 U) l))) |
(*.f64 n (*.f64 l (log.f64 (exp.f64 U)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U l))))) |
(*.f64 n (*.f64 l U)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U l)) 3)) |
(*.f64 n (*.f64 l U)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 U l) 3))) |
(*.f64 n (*.f64 l U)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 U 3))) |
(*.f64 n (*.f64 l U)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U l) 3) (pow.f64 n 3))) |
(*.f64 n (*.f64 l U)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U l)))) |
(*.f64 n (*.f64 l U)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U l)))) |
(*.f64 n (*.f64 l U)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U l))) 1)) |
(*.f64 n (*.f64 l U)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U l)))) |
(*.f64 n (*.f64 l U)) |
(+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 U l) (neg.f64 n))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) 1) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 1) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 3) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3) 1/3) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (sqrt.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 2) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 2)) |
(sqrt.f64 (pow.f64 (*.f64 l (*.f64 n (-.f64 U* U))) 2)) |
(fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) |
(log.f64 (pow.f64 (exp.f64 (-.f64 U* U)) (*.f64 n l))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (-.f64 U* U) n) l) 3)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (-.f64 U* U) 3))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (*.f64 n l) 3))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(exp.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 (-.f64 U* U) n) l)) 1)) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 (-.f64 U* U) n) l))) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) 1) |
(*.f64 n (*.f64 U t)) |
(pow.f64 (*.f64 n (*.f64 U t)) 1) |
(*.f64 n (*.f64 U t)) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U t))) 3) |
(*.f64 n (*.f64 U t)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3) 1/3) |
(*.f64 n (*.f64 U t)) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U t))) 2) |
(*.f64 n (*.f64 U t)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 2)) |
(fabs.f64 (*.f64 n (*.f64 U t))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U) t) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U t))))) |
(*.f64 n (*.f64 U t)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U t)) 3)) |
(*.f64 n (*.f64 U t)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U t)))) |
(*.f64 n (*.f64 U t)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U t)))) |
(*.f64 n (*.f64 U t)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U t))) 1)) |
(*.f64 n (*.f64 U t)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U t)))) |
(*.f64 n (*.f64 U t)) |
Found 2 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 90.1% | (*.f64 (*.f64 2 n) (*.f64 t U)) |
| ✓ | 72.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
Compiled 31 to 17 computations (45.2% saved)
18 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 1.0ms | t | @ | inf | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 1.0ms | n | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 1.0ms | U | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 1.0ms | n | @ | -inf | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 1.0ms | t | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 1× | batch-egg-rewrite |
| 1142× | log-prod |
| 898× | prod-exp |
| 844× | exp-prod |
| 816× | pow-prod-down |
| 542× | pow-prod-up |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 11 | 42 |
| 1 | 221 | 42 |
| 2 | 2619 | 42 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(*.f64 (*.f64 2 n) (*.f64 t U)) |
| Outputs |
|---|
(((+.f64 0 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (sqrt.f64 (*.f64 t U)) (sqrt.f64 (+.f64 n n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 (*.f64 n t))) (sqrt.f64 U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f))) |
(((+.f64 0 (*.f64 2 (*.f64 n (*.f64 t U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) 2)) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 2/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((sqrt.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((expm1.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (log.f64 (+.f64 n n)) (*.f64 (log.f64 (*.f64 t U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (log.f64 (*.f64 t U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (*.f64 (log.f64 (*.f64 t U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 2 (*.f64 n t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 t U)) (*.f64 (log.f64 (+.f64 n n)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (log.f64 (+.f64 n n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (*.f64 (log.f64 (+.f64 n n)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 2 (*.f64 n t))) (*.f64 (log.f64 U) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f)) ((log1p.f64 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (*.f64 (*.f64 2 n) (*.f64 t U))) #f))) |
| 1× | egg-herbie |
| 1076× | log-prod |
| 1024× | unswap-sqr |
| 1014× | exp-sum |
| 966× | fma-def |
| 786× | distribute-lft-in |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 206 | 2802 |
| 1 | 428 | 2726 |
| 2 | 1193 | 2726 |
| 3 | 6275 | 2726 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 0 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(*.f64 (sqrt.f64 (*.f64 t U)) (sqrt.f64 (+.f64 n n))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n t))) (sqrt.f64 U)) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 1/3) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/6) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1/2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) 3)) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1/3)) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(+.f64 0 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) 2)) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 2) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 6) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 2/3) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/2) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 4) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) |
(log.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(exp.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 2)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 3)) |
(exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) 1/3)) |
(exp.f64 (+.f64 (log.f64 (+.f64 n n)) (*.f64 (log.f64 (*.f64 t U)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (log.f64 (*.f64 t U)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (*.f64 (log.f64 (*.f64 t U)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 2 (*.f64 n t))))) |
(exp.f64 (+.f64 (log.f64 (*.f64 t U)) (*.f64 (log.f64 (+.f64 n n)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (log.f64 (+.f64 n n)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (*.f64 (log.f64 (+.f64 n n)) 1))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(exp.f64 (+.f64 (log.f64 (*.f64 2 (*.f64 n t))) (*.f64 (log.f64 U) 1))) |
(log1p.f64 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
| Outputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(+.f64 0 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(*.f64 3 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))))))) |
(*.f64 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) 3) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 1 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (sqrt.f64 (*.f64 t U)) (sqrt.f64 (+.f64 n n))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (*.f64 t U)) (sqrt.f64 (+.f64 n n))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n t))) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/2) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 1/3) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/6) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n)))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) |
(fabs.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1/2)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 1)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 1)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6)) 3)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1/3)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 (*.f64 2 t) n))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(+.f64 0 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) 2)) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) |
(*.f64 3 (log.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 (*.f64 2 t) n))))) |
(*.f64 3 (log.f64 (cbrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 6) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3/2) 2/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3) 1/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 4) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 U (*.f64 (*.f64 2 t) n)))) 2)) (cbrt.f64 (log.f64 (*.f64 U (*.f64 (*.f64 2 t) n))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) 2)) (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 U (*.f64 (*.f64 2 t) n))))) (sqrt.f64 (log.f64 (*.f64 U (*.f64 (*.f64 2 t) n))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) (sqrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) |
(sqrt.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(log.f64 (pow.f64 (exp.f64 U) (*.f64 2 (*.f64 n t)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(expm1.f64 (log1p.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 3)) 1/3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (log.f64 (+.f64 n n)) (*.f64 (log.f64 (*.f64 t U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (log.f64 (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 n n)) 1) (*.f64 (log.f64 (*.f64 t U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 2 (*.f64 n t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (log.f64 (*.f64 t U)) (*.f64 (log.f64 (+.f64 n n)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (log.f64 (+.f64 n n)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 t U)) 1) (*.f64 (log.f64 (+.f64 n n)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(exp.f64 (+.f64 (log.f64 (*.f64 2 (*.f64 n t))) (*.f64 (log.f64 U) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
(log1p.f64 (expm1.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 (*.f64 2 t) n)) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 93.1% | (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U) |
| ✓ | 80.7% | (*.f64 (*.f64 l l) (*.f64 U* n)) |
| ✓ | 77.2% | (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
| ✓ | 57.1% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
Compiled 96 to 22 computations (77.1% saved)
51 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 4.0ms | U* | @ | 0 | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
| 4.0ms | U* | @ | -inf | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
| 4.0ms | U* | @ | inf | (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
| 3.0ms | n | @ | 0 | (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
| 3.0ms | U | @ | 0 | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
| 1× | batch-egg-rewrite |
| 942× | pow-prod-up |
| 834× | pow-exp |
| 662× | expm1-udef |
| 660× | log1p-udef |
| 580× | log-pow |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 18 | 146 |
| 1 | 376 | 138 |
| 2 | 5055 | 138 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) |
(*.f64 (*.f64 l l) (*.f64 U* n)) |
(*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 1 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (sqrt.f64 (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (pow.f64 Om -2) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) (sqrt.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 1 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 (sqrt.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 (sqrt.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((/.f64 (neg.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((fabs.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (exp.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((expm1.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log1p.f64 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 2 (/.f64 1 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 2 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 2 (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 Om -2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 1 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 2 Om) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) (/.f64 2 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (*.f64 2 n) (*.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 2 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) 1) (/.f64 2 (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 1 Om) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 1 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 Om) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 1) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 2 n) 1) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (/.f64 (*.f64 2 n) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((*.f64 (pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 5/6) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 2/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (/.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) 1) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((sqrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 3) (pow.f64 Om 6))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((expm1.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log1p.f64 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (*.f64 (pow.f64 l 6) (pow.f64 (*.f64 n U*) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n U*) 3) (pow.f64 l 6))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 3 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n U*)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l)) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) (pow.f64 U 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((expm1.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f)) ((log1p.f64 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om)) (*.f64 (*.f64 l l) (*.f64 U* n)) (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U)) #f))) |
| 1× | egg-herbie |
| 1024× | log-prod |
| 720× | associate-*r* |
| 664× | associate-*l* |
| 526× | swap-sqr |
| 482× | cube-prod |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 373 | 13076 |
| 1 | 985 | 13076 |
| 2 | 4220 | 13068 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) |
(*.f64 1 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (sqrt.f64 (pow.f64 Om -2))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (pow.f64 Om -2) 1/2)) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (/.f64 1 Om)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) (sqrt.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) 1/2)) |
(/.f64 1 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)))) |
(/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(/.f64 (sqrt.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) (neg.f64 Om)) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1/2) |
(pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) |
(pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 3) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2) |
(pow.f64 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1) |
(pow.f64 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) -1) |
(fabs.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(log.f64 (exp.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)))) |
(cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3)) |
(expm1.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(exp.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1/2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 2)) |
(log1p.f64 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 1) |
(*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) |
(*.f64 2 (/.f64 1 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(*.f64 2 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 Om -2))) |
(*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 2 (pow.f64 Om -2))) |
(*.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 Om -2)) |
(*.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(*.f64 1 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) |
(*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (pow.f64 Om -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2)) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 Om -2))) |
(*.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om)) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) (/.f64 2 Om)) |
(*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) |
(*.f64 (*.f64 2 n) (*.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om) (/.f64 1 Om)) |
(*.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(*.f64 (/.f64 2 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) 1) (/.f64 2 (*.f64 Om Om))) |
(*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 1 Om) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) |
(*.f64 (/.f64 1 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 Om) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 1) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om)) |
(*.f64 (/.f64 (*.f64 2 n) 1) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 2 n) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 5/6) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) |
(pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 2) |
(pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 6) |
(pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 3) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 2/3) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4) 1/2) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) |
(pow.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) -1) |
(pow.f64 (/.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) 1) -1) |
(neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (*.f64 Om (neg.f64 Om)))) |
(sqrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) |
(log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) |
(cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 3) (pow.f64 Om 6))) |
(expm1.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(exp.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 2)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 3)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) 1/2)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) 1/3)) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1)) |
(log1p.f64 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
(pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 2) |
(sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 4)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 l 6) (pow.f64 (*.f64 n U*) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n U*) 3) (pow.f64 l 6))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(exp.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) |
(exp.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1)) |
(exp.f64 (*.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n U*)))) 2)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1) |
(pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 1) |
(pow.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 3) |
(pow.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3) 1/3) |
(pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 2) |
(sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 4)) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l)) U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))))) |
(cbrt.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) (pow.f64 U 3))) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3))) |
(expm1.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
(exp.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 2)) |
(log1p.f64 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U U*))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U* U))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 1 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))))) |
(*.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))))) |
(*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))))) |
(*.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (sqrt.f64 (pow.f64 Om -2))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (pow.f64 Om -2) 1/2)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (/.f64 1 Om)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) (sqrt.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) 4)) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) 4)) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))))) (pow.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) 2)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) 4)) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) 4)) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))))) (pow.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) 2)) |
(*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) 1/2)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(/.f64 1 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U))) Om))) |
(/.f64 1 (sqrt.f64 (*.f64 Om (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U n) (*.f64 l l))) (*.f64 n U*)))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 Om U) (/.f64 Om (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*))))))) |
(/.f64 (sqrt.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (/.f64 Om (*.f64 2 U)))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 (/.f64 l Om) (*.f64 l (*.f64 U* (*.f64 U n))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) -2))) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 -2 (*.f64 (*.f64 U n) (*.f64 l l))) (*.f64 n U*))) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 n U*) -2)))) (sqrt.f64 (neg.f64 (*.f64 Om Om)))) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1/2) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) |
(pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 1) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 3) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 1/3) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(pow.f64 (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U))) Om))) |
(/.f64 1 (sqrt.f64 (*.f64 Om (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(pow.f64 (/.f64 Om (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))))) -1) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(fabs.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(log.f64 (exp.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(expm1.f64 (log1p.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1/2)) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 1)) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 1)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 3)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 1/3)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) 2)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(log1p.f64 (expm1.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (/.f64 1 (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 2 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 2 (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 Om -2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 1 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) (pow.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) 4)) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) (pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) 4)) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) (pow.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) 4)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) (pow.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) 4)) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) (pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) 4)) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))) (pow.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) 4)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (pow.f64 Om -2))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U)) 2)) (*.f64 (pow.f64 Om -2) (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U))))) |
(*.f64 (pow.f64 Om -2) (*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)) 2)) (cbrt.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2))))) |
(*.f64 (pow.f64 Om -2) (*.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U))))) 2)) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om) (/.f64 2 Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (*.f64 2 n) (*.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om) (/.f64 1 Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3/2) (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 2 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (*.f64 Om (cbrt.f64 Om))) (/.f64 U (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (/.f64 U (pow.f64 (cbrt.f64 Om) 2)) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 2 (/.f64 n Om)) (cbrt.f64 Om)) (/.f64 (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) 1) (/.f64 2 (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (*.f64 Om (cbrt.f64 Om))) (/.f64 U (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (/.f64 U (pow.f64 (cbrt.f64 Om) 2)) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 2 (/.f64 n Om)) (cbrt.f64 Om)) (/.f64 (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 1 Om) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 1 (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (*.f64 Om (cbrt.f64 Om))) (/.f64 U (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (/.f64 U (pow.f64 (cbrt.f64 Om) 2)) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 2 (/.f64 n Om)) (cbrt.f64 Om)) (/.f64 (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U)) 2)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U))) Om)) |
(/.f64 (*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)) 2)) (cbrt.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)))) (*.f64 Om Om)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U))))) 2)) (/.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U)) 2)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U))) Om)) |
(/.f64 (*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)) 2)) (cbrt.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)))) (*.f64 Om Om)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U))))) 2)) (/.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 2)) (*.f64 (cbrt.f64 Om) Om)) (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)))) (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U)) 2)) (*.f64 Om (cbrt.f64 Om)))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) (/.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)) 2)) (*.f64 Om (cbrt.f64 Om)))) |
(/.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U))))) 2)) (/.f64 (*.f64 Om (cbrt.f64 Om)) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2)))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 1) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (*.f64 Om (cbrt.f64 Om))) (/.f64 U (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (/.f64 U (pow.f64 (cbrt.f64 Om) 2)) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 2 (/.f64 n Om)) (cbrt.f64 Om)) (/.f64 (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 2 n) 1) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(*.f64 (/.f64 (*.f64 2 n) (*.f64 (cbrt.f64 Om) Om)) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (*.f64 Om (cbrt.f64 Om))) (/.f64 U (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (/.f64 U (pow.f64 (cbrt.f64 Om) 2)) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 2 (/.f64 n Om)) (cbrt.f64 Om)) (/.f64 (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 5/6) (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) l) (sqrt.f64 (*.f64 n (*.f64 U U*)))) Om)) (pow.f64 (*.f64 (*.f64 (/.f64 2 (*.f64 Om Om)) U) (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) 5/6)) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 2 n)) Om) (*.f64 l (sqrt.f64 (*.f64 U* (*.f64 U n)))))) (pow.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) 5/6)) |
(*.f64 (cbrt.f64 (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l)))) (pow.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) 5/6)) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 2) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (cbrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 6) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 3) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 3) 2/3) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4) 1/2) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6) 1/3) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (sqrt.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 4) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) -1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(pow.f64 (/.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om)) 1) -1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) (*.f64 Om (neg.f64 Om)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(sqrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(cbrt.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) 3) (pow.f64 Om 6))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 2 U)) 3) (pow.f64 Om 6))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U* (*.f64 U n)) 2)) 3) (pow.f64 Om 6))) |
(cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) 3) 8) (pow.f64 Om 6))) |
(expm1.f64 (log1p.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1) 1)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2) 2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om)) 1) 2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) 3)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 4)) 1/2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (/.f64 (*.f64 (sqrt.f64 (*.f64 2 n)) (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) Om) 6)) 1/3)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*)) (*.f64 U 2)) Om))) -1)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(log1p.f64 (expm1.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U*))) (*.f64 Om Om)) |
(*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*)))) |
(*.f64 2 (*.f64 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))) (pow.f64 Om -2))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 2) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n U*))) 4)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(cbrt.f64 (*.f64 (pow.f64 l 6) (pow.f64 (*.f64 n U*) 3))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n U*) 3) (pow.f64 l 6))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (*.f64 (*.f64 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*))) 1) 1)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 3)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (*.f64 (*.f64 3 (fma.f64 2 (log.f64 l) (log.f64 (*.f64 n U*)))) 1/3)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n U*)))) 2)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 l (*.f64 n U*))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 1) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(pow.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 3) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(pow.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3) 1/3) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 2) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(sqrt.f64 (pow.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U)))) 4)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U*) n) (*.f64 l l)) U)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(cbrt.f64 (pow.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) 3)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) (pow.f64 U 3))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(cbrt.f64 (*.f64 (pow.f64 U 3) (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(expm1.f64 (log1p.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U))))) 1) 1)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 3)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) 1/3)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 l (sqrt.f64 (*.f64 n (*.f64 U* U))))) 2)) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
(log1p.f64 (expm1.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))))) |
(*.f64 (*.f64 n (*.f64 l l)) (*.f64 U U*)) |
(*.f64 n (*.f64 l (*.f64 l (*.f64 U U*)))) |
(*.f64 n (*.f64 U* (*.f64 l (*.f64 l U)))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 92.4% | (/.f64 Om (*.f64 l U)) |
| ✓ | 91.4% | (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
| 89.5% | (*.f64 (*.f64 n l) (-.f64 U* U)) | |
| ✓ | 56.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
Compiled 128 to 40 computations (68.8% saved)
39 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 30.0ms | U | @ | -inf | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
| 4.0ms | U* | @ | inf | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
| 4.0ms | Om | @ | -inf | (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
| 3.0ms | l | @ | 0 | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
| 2.0ms | U | @ | inf | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
| 1× | batch-egg-rewrite |
| 888× | expm1-udef |
| 884× | log1p-udef |
| 506× | add-sqr-sqrt |
| 494× | pow1 |
| 494× | *-un-lft-identity |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 22 | 143 |
| 1 | 488 | 143 |
| 2 | 7208 | 143 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) |
(/.f64 Om (*.f64 l U)) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U)))) (sqrt.f64 (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (*.f64 2 n) (/.f64 Om (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 1 (/.f64 (/.f64 Om (*.f64 l U)) (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 Om (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (neg.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (*.f64 (*.f64 2 n) (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (*.f64 (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (*.f64 2 n)) (/.f64 (neg.f64 Om) (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) Om) (/.f64 (/.f64 1 U) l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) 1) (/.f64 Om (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) (*.f64 2 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3) (pow.f64 (*.f64 2 n) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 Om (/.f64 (/.f64 1 U) l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 Om (*.f64 l U)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 1 (/.f64 Om (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2) (cbrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (neg.f64 Om) (/.f64 1 (*.f64 l (neg.f64 U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (/.f64 1 U) l) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 Om l) (/.f64 1 U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 l U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) l) (/.f64 (sqrt.f64 Om) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 1 l) (/.f64 Om U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 1 U) (/.f64 Om l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 Om (cbrt.f64 (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 (*.f64 l U))) (/.f64 Om (sqrt.f64 (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) l) (/.f64 (cbrt.f64 Om) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 l U))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (/.f64 Om (*.f64 l U)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((pow.f64 (/.f64 l (/.f64 Om U)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((neg.f64 (/.f64 Om (*.f64 l (neg.f64 U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (exp.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 l U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 l U) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((expm1.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (log.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 l U))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f)) ((log1p.f64 (expm1.f64 (/.f64 Om (*.f64 l U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U)))) (/.f64 Om (*.f64 l U))) #f))) |
| 1× | egg-herbie |
| 1654× | fma-def |
| 880× | associate-*r* |
| 738× | associate-*l* |
| 658× | times-frac |
| 638× | *-commutative |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 466 | 13862 |
| 1 | 1351 | 13624 |
| 2 | 5761 | 13250 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))))) (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 3)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) (*.f64 (pow.f64 l 7) U)) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5))))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1)))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1))) (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/8 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U)))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1) |
(/.f64 (*.f64 2 n) (/.f64 Om (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 l U)))) |
(/.f64 1 (/.f64 (/.f64 Om (*.f64 l U)) (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))))) |
(/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 Om (*.f64 l U))) |
(/.f64 (neg.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(/.f64 (*.f64 (*.f64 2 n) (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(/.f64 (*.f64 (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (*.f64 2 n)) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) Om) (/.f64 (/.f64 1 U) l)) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) 1) (/.f64 Om (*.f64 l U))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3) 1/3) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) (*.f64 2 n))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3) (pow.f64 (*.f64 2 n) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) 1) |
(*.f64 Om (/.f64 (/.f64 1 U) l)) |
(*.f64 (/.f64 Om (*.f64 l U)) 1) |
(*.f64 1 (/.f64 Om (*.f64 l U))) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) l))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) l))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 l (neg.f64 U)))) |
(*.f64 (/.f64 (/.f64 1 U) l) Om) |
(*.f64 (/.f64 Om l) (/.f64 1 U)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 l U))) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 l U))) |
(*.f64 (/.f64 (sqrt.f64 Om) l) (/.f64 (sqrt.f64 Om) U)) |
(*.f64 (/.f64 1 l) (/.f64 Om U)) |
(*.f64 (/.f64 1 U) (/.f64 Om l)) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 Om (cbrt.f64 (*.f64 l U)))) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 l U))) (/.f64 Om (sqrt.f64 (*.f64 l U)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) l) (/.f64 (cbrt.f64 Om) U)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) l)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 l U))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 l U)))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) l)) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 l U)))) |
(pow.f64 (/.f64 Om (*.f64 l U)) 1) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 3) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) 2) |
(pow.f64 (/.f64 l (/.f64 Om U)) -1) |
(neg.f64 (/.f64 Om (*.f64 l (neg.f64 U)))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2)) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 l U)))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 l U))))) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3)) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 l U) 3))) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 l U)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 l U))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 l U)))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(-.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(fma.f64 (sqrt.f64 2) (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 -1/2 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n n) (*.f64 l (*.f64 Om Om)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 l (*.f64 Om Om))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) -1/2))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 l (*.f64 Om Om))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) -1/2) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (sqrt.f64 2) l)))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2))))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l))))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(*.f64 -1 (+.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2)))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))))) |
(neg.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 -2) (/.f64 (sqrt.f64 -1) l)) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l)))))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) n) (pow.f64 (sqrt.f64 -1) 3))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2))))))))) |
(-.f64 (fma.f64 (neg.f64 (/.f64 (sqrt.f64 -2) (/.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 1/2 (*.f64 (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 -1 n))) (*.f64 l (sqrt.f64 -2)))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l))))) |
(fma.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 1/2 (*.f64 (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 -1 n))) (*.f64 l (sqrt.f64 -2)))) (neg.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 -2) (/.f64 (sqrt.f64 -1) l)) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (/.f64 (*.f64 (*.f64 Om Om) (*.f64 l (sqrt.f64 -2))) (*.f64 n n)) (pow.f64 (sqrt.f64 -1) 5))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) n) (pow.f64 (sqrt.f64 -1) 3))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 -2)))))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 (*.f64 (/.f64 Om n) (/.f64 Om n)) (/.f64 l (/.f64 (pow.f64 (sqrt.f64 -1) 5) (sqrt.f64 -2))))) (-.f64 (fma.f64 (neg.f64 (/.f64 (sqrt.f64 -2) (/.f64 (sqrt.f64 -1) l))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 1/2 (*.f64 (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 -1 n))) (*.f64 l (sqrt.f64 -2)))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l)))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 (*.f64 (/.f64 Om n) (/.f64 Om n)) (/.f64 l (/.f64 (pow.f64 (sqrt.f64 -1) 5) (sqrt.f64 -2))))) (fma.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 1/2 (*.f64 (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 -1 n))) (*.f64 l (sqrt.f64 -2)))) (neg.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 -2) (/.f64 (sqrt.f64 -1) l)) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 n (/.f64 Om (*.f64 (*.f64 (sqrt.f64 -1) (sqrt.f64 -2)) l)))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 (*.f64 U (pow.f64 l 3)) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) (pow.f64 l 3))))) (*.f64 1/2 (*.f64 (sqrt.f64 2) U*)))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) (*.f64 (sqrt.f64 (/.f64 (pow.f64 n 3) (*.f64 (pow.f64 (/.f64 Om l) 3) (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) U*)))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 (*.f64 U (pow.f64 l 3)) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)))))) (*.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 U* U*))) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)) 3))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) (pow.f64 l 3))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 3) (pow.f64 l 5))))) (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 U* U*)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) (fma.f64 (sqrt.f64 (/.f64 (pow.f64 n 3) (*.f64 (pow.f64 (/.f64 Om l) 3) (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) U*)) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 3) (pow.f64 l 5))))) (*.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 U* U*)))))) |
(+.f64 (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) U*) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 2)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))))) (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 3)) (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) (*.f64 (pow.f64 l 7) U)) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5))))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 (*.f64 U (pow.f64 l 3)) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)))))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 U* U*) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)) 3)))))) (*.f64 (*.f64 1/16 (*.f64 (sqrt.f64 2) (pow.f64 U* 3))) (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 (pow.f64 n 7) (pow.f64 l 7)) U) (pow.f64 Om 7)) (pow.f64 (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)) 5))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) (pow.f64 l 3))))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 U* U*) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 3) (pow.f64 l 5))))))) (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 3)) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 Om 7)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 5) (pow.f64 l 7))))) 1/16))))) |
(fma.f64 (sqrt.f64 2) (*.f64 (*.f64 U* (sqrt.f64 (/.f64 (pow.f64 n 3) (*.f64 (pow.f64 (/.f64 Om l) 3) (/.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) U))))) 1/2) (fma.f64 (sqrt.f64 2) (*.f64 (*.f64 (*.f64 U* U*) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 3) (pow.f64 l 5)))))) -1/8) (fma.f64 (*.f64 (sqrt.f64 2) (pow.f64 U* 3)) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 Om 7)) (/.f64 U (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))) 5) (pow.f64 l 7))))) 1/16) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))))))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U)))) Om) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1)))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1)))) |
(+.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) n) (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1))))) |
(+.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) n) (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (fma.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U)))) (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))))) |
(+.f64 (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1))))))) (*.f64 (/.f64 -1/8 n) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (*.f64 (sqrt.f64 2) Om)) (*.f64 (sqrt.f64 -1) (*.f64 l (neg.f64 U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (fma.f64 (/.f64 -1/8 n) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (*.f64 (sqrt.f64 2) Om)) (*.f64 (sqrt.f64 -1) (*.f64 l (neg.f64 U)))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1)))))))) |
(+.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))) (+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) (sqrt.f64 -1))) (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))))) |
(+.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) n) (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (fma.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) Om) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U)))) (fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (/.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 3))) (*.f64 (*.f64 n n) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (*.f64 l l) (*.f64 U U)))))))) |
(+.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1)))))) (fma.f64 -1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 Om (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 l (neg.f64 U))) (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (/.f64 1/16 (*.f64 n n)) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3) (*.f64 (sqrt.f64 2) (*.f64 Om Om))) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 l (*.f64 l (*.f64 U U))))))))) |
(fma.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (*.f64 l (*.f64 U (sqrt.f64 -1)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (fma.f64 (/.f64 -1/8 n) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (*.f64 (sqrt.f64 2) Om)) (*.f64 (sqrt.f64 -1) (*.f64 l (neg.f64 U)))) (*.f64 (/.f64 1/16 (*.f64 n n)) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3) (*.f64 (sqrt.f64 2) (*.f64 Om Om))) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 l (*.f64 l (*.f64 U U))))))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(/.f64 (neg.f64 (*.f64 l (*.f64 n (*.f64 U (sqrt.f64 -2))))) Om) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) (neg.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))))) |
(-.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (*.f64 1/8 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (*.f64 1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 2)) (*.f64 l U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (-.f64 (*.f64 (*.f64 1/8 (/.f64 Om n)) (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (/.f64 (*.f64 l U) (sqrt.f64 -2)))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(fma.f64 (sqrt.f64 -2) (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 1/2) (-.f64 (*.f64 (*.f64 1/8 (/.f64 Om n)) (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (/.f64 (*.f64 l U) (sqrt.f64 -2)))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 -2) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (*.f64 1/8 (/.f64 (*.f64 Om (*.f64 (sqrt.f64 -2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 l (*.f64 U (sqrt.f64 -2))))) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 3)) (*.f64 (*.f64 l l) (*.f64 U U)))) (*.f64 1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 2)) (*.f64 l U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 -2) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (-.f64 (fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om (*.f64 Om (sqrt.f64 -2))) (*.f64 n n)) (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3) (*.f64 l (*.f64 l (*.f64 U U))))) (*.f64 (*.f64 1/8 (/.f64 Om n)) (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (/.f64 (*.f64 l U) (sqrt.f64 -2))))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (sqrt.f64 -2)))))) |
(fma.f64 (sqrt.f64 -2) (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 1/2) (fma.f64 (*.f64 1/8 (/.f64 Om n)) (/.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 2) (/.f64 (*.f64 l U) (sqrt.f64 -2))) (fma.f64 (/.f64 1/16 (*.f64 n n)) (/.f64 (*.f64 (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3) (*.f64 Om (*.f64 Om (sqrt.f64 -2)))) (*.f64 l (*.f64 l (*.f64 U U)))) (/.f64 (neg.f64 (*.f64 l (*.f64 n (*.f64 U (sqrt.f64 -2))))) Om)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(-.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(fma.f64 (sqrt.f64 2) (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 -1/2 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n n) (*.f64 l (*.f64 Om Om)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 l (*.f64 Om Om))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) -1/2))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 l (*.f64 Om Om))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) -1/2) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (sqrt.f64 2) l)))))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om)) |
(/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(*.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(*.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U))) Om)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om)) |
(/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om)) |
(/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om)) |
(/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om)) |
(/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2)))))) |
(*.f64 2 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* U) (*.f64 n n))) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* U) (*.f64 n n))) Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 n (/.f64 (/.f64 Om l) U)) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))))) |
(*.f64 2 (+.f64 (*.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l)))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (fma.f64 (/.f64 n Om) (*.f64 U (*.f64 l (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 (/.f64 Om U) l))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) Om) |
(/.f64 (*.f64 2 n) (/.f64 (/.f64 Om l) (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om))) |
(/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) U))) (*.f64 -2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U))) (*.f64 Om Om)))) |
(fma.f64 2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 Om (/.f64 (*.f64 l (*.f64 l (*.f64 U U))) Om)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(*.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om)) |
(/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om)) |
(/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(fma.f64 2 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))) (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) 1) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 1 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U)))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (/.f64 l (/.f64 Om U))))) |
(*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4)) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 2) (pow.f64 (*.f64 (*.f64 n (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) 1/2)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U))))))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U))))))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) (sqrt.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))) (sqrt.f64 (/.f64 (/.f64 Om l) U))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/2) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 3) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1/4) 2) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(fabs.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1/2)) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1)) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (*.f64 (/.f64 l Om) U) (*.f64 2 n)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) 1) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 (*.f64 2 n) (/.f64 Om (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 l U)))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 1 (/.f64 (/.f64 Om (*.f64 l U)) (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))))) |
(*.f64 (/.f64 1 (/.f64 (/.f64 Om l) U)) (*.f64 2 (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))) |
(*.f64 (*.f64 (/.f64 1 (/.f64 (/.f64 Om U) l)) (*.f64 2 n)) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (/.f64 1 (/.f64 (/.f64 Om U) l)) (*.f64 2 n)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 Om (*.f64 l U))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(*.f64 (/.f64 (*.f64 (neg.f64 (*.f64 2 n)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))) (neg.f64 Om)) (*.f64 l U)) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(/.f64 (*.f64 (*.f64 2 n) (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(*.f64 (/.f64 (*.f64 (neg.f64 (*.f64 2 n)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))) (neg.f64 Om)) (*.f64 l U)) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(/.f64 (*.f64 (neg.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (*.f64 2 n)) (/.f64 (neg.f64 Om) (*.f64 l U))) |
(*.f64 (/.f64 (*.f64 (neg.f64 (*.f64 2 n)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))) (neg.f64 Om)) (*.f64 l U)) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) Om) (/.f64 (/.f64 1 U) l)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) 1) (/.f64 Om (*.f64 l U))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(/.f64 (/.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 1) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 2) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 3) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2) 1/2) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3) 1/3) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 2)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l)))) (/.f64 l (/.f64 Om U))) (*.f64 2 n))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))) 3)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 2 n) 3) (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (/.f64 l (/.f64 Om U))) 3) (pow.f64 (*.f64 2 n) 3))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n)))) 1)) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))) (*.f64 (/.f64 l (/.f64 Om U)) (*.f64 2 n))))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2))) Om)) |
(*.f64 2 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(*.f64 2 (*.f64 (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2)) (*.f64 n (/.f64 l (/.f64 Om U))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) 1) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 Om (/.f64 (/.f64 1 U) l)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 Om (*.f64 l U)) 1) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 1 (/.f64 Om (*.f64 l U))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) l))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 2) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) l))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 l (neg.f64 U)))) |
(/.f64 (*.f64 (neg.f64 Om) 1) (*.f64 l (neg.f64 U))) |
(/.f64 (neg.f64 Om) (*.f64 l (neg.f64 U))) |
(*.f64 (/.f64 (/.f64 1 U) l) Om) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 Om l) (/.f64 1 U)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 l U))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 l U))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (sqrt.f64 Om) l) (/.f64 (sqrt.f64 Om) U)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 1 l) (/.f64 Om U)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 1 U) (/.f64 Om l)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 Om (cbrt.f64 (*.f64 l U)))) |
(/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 l U))) (/.f64 Om (sqrt.f64 (*.f64 l U)))) |
(/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) l) (/.f64 (cbrt.f64 Om) U)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) l)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (cbrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (cbrt.f64 (/.f64 (/.f64 Om l) U)) (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))) |
(*.f64 (cbrt.f64 (/.f64 (/.f64 Om U) l)) (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 l U))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 l U)))) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 l U))) (/.f64 Om (sqrt.f64 (*.f64 l U)))) |
(/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) l)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 l U)))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) (/.f64 Om (cbrt.f64 (*.f64 l U)))) |
(/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2)) |
(pow.f64 (/.f64 Om (*.f64 l U)) 1) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 l U))) 3) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3) 1/3) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 l U))) 2) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(pow.f64 (/.f64 l (/.f64 Om U)) -1) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(neg.f64 (/.f64 Om (*.f64 l (neg.f64 U)))) |
(/.f64 (*.f64 (neg.f64 Om) 1) (*.f64 l (neg.f64 U))) |
(/.f64 (neg.f64 Om) (*.f64 l (neg.f64 U))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 l U))))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 3)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 l U) 3))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 l U))) 1)) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 l U)))) |
(/.f64 (/.f64 Om l) U) |
(/.f64 (/.f64 Om U) l) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 90.6% | (*.f64 n (*.f64 l (-.f64 U* U))) |
| ✓ | 89.6% | (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) |
| 89.5% | (*.f64 n (*.f64 l U)) | |
| ✓ | 56.0% | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
Compiled 150 to 45 computations (70% saved)
42 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 2.0ms | Om | @ | -inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
| 2.0ms | U* | @ | inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
| 1.0ms | n | @ | -inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
| 1.0ms | n | @ | 0 | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
| 1.0ms | U | @ | 0 | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
| 1× | batch-egg-rewrite |
| 1382× | fma-def |
| 800× | expm1-udef |
| 798× | log1p-udef |
| 452× | add-sqr-sqrt |
| 444× | pow1 |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 20 | 145 |
| 1 | 436 | 137 |
| 2 | 6413 | 137 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) |
(/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) |
(*.f64 n (*.f64 l (-.f64 U* U))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (/.f64 1 Om) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n))))) (sqrt.f64 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))))) (neg.f64 (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n)))) (/.f64 1 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (*.f64 (*.f64 l U) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) 1) (/.f64 (*.f64 l U) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l U) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 Om)) (/.f64 (*.f64 l U) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) 3) (pow.f64 Om 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f))) |
(((+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 n l) (neg.f64 U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (*.f64 (*.f64 n l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U (+.f64 U* U) (*.f64 U* U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((/.f64 (*.f64 (*.f64 n l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 l) (-.f64 U* U)) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l (-.f64 U* U)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 l (-.f64 U* U)) 3) (pow.f64 n 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((fma.f64 U* (*.f64 n l) (*.f64 (neg.f64 U) (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f)) ((fma.f64 (*.f64 n l) U* (*.f64 (*.f64 n l) (neg.f64 U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om) (*.f64 n (*.f64 l (-.f64 U* U)))) #f))) |
| 1× | egg-herbie |
| 1774× | fma-def |
| 952× | associate-*r* |
| 832× | associate-*l* |
| 700× | log-prod |
| 618× | associate-/l* |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 467 | 15265 |
| 1 | 1345 | 14793 |
| 2 | 5855 | 14677 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om l) (*.f64 n (pow.f64 (sqrt.f64 -1) 2))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om l) (*.f64 n (pow.f64 (sqrt.f64 -1) 2))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 4))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (+.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (pow.f64 U* 2))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (+.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (pow.f64 U* 2))) (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) (*.f64 (pow.f64 l 7) U)) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5)))) (pow.f64 U* 3)))))) |
(/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om) |
(+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1)))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (+.f64 (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1))) (*.f64 -1/8 (/.f64 (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) (+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (+.f64 (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1))) (*.f64 -1/8 (/.f64 (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U)))))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) |
(+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))))) |
(*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 n (*.f64 l U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (/.f64 1 Om) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 (sqrt.f64 Om))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) |
(/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))))) (neg.f64 (sqrt.f64 Om))) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) |
(*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) |
(*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 Om))) |
(*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (/.f64 1 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n)))) (/.f64 1 (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) |
(*.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (*.f64 (*.f64 l U) (/.f64 1 Om))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (cbrt.f64 Om))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) 1) (/.f64 (*.f64 l U) Om)) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l U) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 Om)) (/.f64 (*.f64 l U) (sqrt.f64 Om))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) |
(pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) -1) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (neg.f64 Om))) |
(sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) |
(log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) 3) (pow.f64 Om 3))) |
(expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 n l) (neg.f64 U))) |
(+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) 1) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U (+.f64 U* U) (*.f64 U* U*))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) |
(pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 1) |
(pow.f64 (cbrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 3) |
(pow.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 l) (-.f64 U* U)) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l))))) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l (-.f64 U* U)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 l (-.f64 U* U)) 3) (pow.f64 n 3))) |
(expm1.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(exp.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(fma.f64 U* (*.f64 n l) (*.f64 (neg.f64 U) (*.f64 n l))) |
(fma.f64 (*.f64 n l) U* (*.f64 (*.f64 n l) (neg.f64 U))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om (/.f64 n l)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)))) |
(fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (-.f64 (*.f64 (*.f64 (/.f64 Om n) l) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) -1/2)) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om (/.f64 n l)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (/.f64 (*.f64 l (*.f64 Om Om)) (*.f64 n n))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))))) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 l (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (*.f64 (*.f64 n (pow.f64 (sqrt.f64 -1) 2)) l) Om))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (/.f64 n Om) (neg.f64 l)))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(*.f64 -1 (+.f64 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (*.f64 (*.f64 n (pow.f64 (sqrt.f64 -1) 2)) l) Om)))) |
(neg.f64 (fma.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (neg.f64 l))))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om l) (*.f64 n (pow.f64 (sqrt.f64 -1) 2))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 (/.f64 Om n) (/.f64 l (pow.f64 (sqrt.f64 -1) 2)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (*.f64 (*.f64 n (pow.f64 (sqrt.f64 -1) 2)) l) Om))))) |
(-.f64 (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 l (/.f64 (neg.f64 n) Om))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (/.f64 n Om) (neg.f64 l))))) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(fma.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (*.f64 1/2 Om) (/.f64 (neg.f64 n) l)) (neg.f64 (fma.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (neg.f64 l)))))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 Om l) (*.f64 n (pow.f64 (sqrt.f64 -1) 2))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 4))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 2) l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 (/.f64 Om n) (/.f64 l (pow.f64 (sqrt.f64 -1) 2)))) (fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (/.f64 (*.f64 l (*.f64 Om Om)) (*.f64 n n)) (pow.f64 (sqrt.f64 -1) 4))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (*.f64 (*.f64 n (pow.f64 (sqrt.f64 -1) 2)) l) Om)))))) |
(+.f64 (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 l (/.f64 (neg.f64 n) Om))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))) 1))) (neg.f64 (fma.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (neg.f64 l)))))) |
(+.f64 (fma.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (*.f64 1/2 Om) (/.f64 (neg.f64 n) l)) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))) 1))) (neg.f64 (fma.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 n Om) (neg.f64 l)))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om)) l) |
(*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2))))) |
(*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) (*.f64 l (sqrt.f64 -1)))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -1)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) (*.f64 l (sqrt.f64 -1)))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -1)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) (*.f64 l (sqrt.f64 -1)))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -1)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)) (*.f64 (sqrt.f64 -1) l))) |
(neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) (*.f64 l (sqrt.f64 -1)))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) (neg.f64 (*.f64 l (sqrt.f64 -1)))) |
(sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)))))) |
(sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om))) |
(fma.f64 1/2 (*.f64 U* (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (*.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) (pow.f64 Om 3)) (*.f64 U (pow.f64 l 3)))))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))))) |
(fma.f64 1/2 (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))))) |
(fma.f64 U* (*.f64 1/2 (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (+.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (pow.f64 U* 2))))) |
(+.f64 (fma.f64 1/2 (*.f64 U* (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (*.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) (pow.f64 Om 3)) (*.f64 U (pow.f64 l 3)))))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 U (pow.f64 l 5))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) 3))) (*.f64 U* U*)))) |
(fma.f64 1/2 (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 3)))) (*.f64 U* U*)) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))))) |
(fma.f64 U* (*.f64 1/2 (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 3)))) (*.f64 U* U*)) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) U)) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) U*)) (+.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 5) U)) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (pow.f64 U* 2))) (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) (*.f64 (pow.f64 l 7) U)) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5)))) (pow.f64 U* 3)))))) |
(+.f64 (fma.f64 1/2 (*.f64 U* (sqrt.f64 (/.f64 (pow.f64 n 3) (/.f64 (*.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) (pow.f64 Om 3)) (*.f64 U (pow.f64 l 3)))))) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 U (pow.f64 l 5))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) 3))) (*.f64 U* U*)) (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 (pow.f64 n 7) (pow.f64 l 7)) U) (pow.f64 Om 7)) (pow.f64 (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2)) 5))) (pow.f64 U* 3))))) |
(+.f64 (fma.f64 1/2 (*.f64 U* (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 U (pow.f64 l 7)) (/.f64 (pow.f64 Om 7) (pow.f64 n 7))) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 5))) (pow.f64 U* 3)) (*.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 3)))) (*.f64 U* U*))))) |
(fma.f64 U* (*.f64 1/2 (sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n l) 3) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))) (/.f64 U (pow.f64 Om 3))))) (fma.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 U (pow.f64 l 7)) (/.f64 (pow.f64 Om 7) (pow.f64 n 7))) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 5))) (*.f64 (pow.f64 U* 3) 1/16) (fma.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 Om 5)) (/.f64 (*.f64 U (pow.f64 l 5)) (pow.f64 (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))) 3)))) (*.f64 U* U*)) (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))))))) |
(/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om) |
(/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 l (*.f64 n U)))) |
(*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1)))) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l U)))) (/.f64 (*.f64 1/2 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om))) (sqrt.f64 -1))) |
(fma.f64 1/2 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (sqrt.f64 -1)) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U)))) |
(+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (+.f64 (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1))) (*.f64 -1/8 (/.f64 (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U))))))) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l U)))) (fma.f64 1/2 (/.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) (sqrt.f64 -1)) (*.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 2) (*.f64 (*.f64 l U) (pow.f64 (sqrt.f64 -1) 3))))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U))) (fma.f64 -1/8 (*.f64 (/.f64 Om (*.f64 (neg.f64 n) (sqrt.f64 -1))) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 l U))) (/.f64 1/2 (/.f64 (sqrt.f64 -1) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) |
(fma.f64 1/2 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (sqrt.f64 -1)) (fma.f64 -1/8 (*.f64 (/.f64 Om (*.f64 (neg.f64 n) (sqrt.f64 -1))) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 l U))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U))))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) (+.f64 (/.f64 (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U))) Om) (+.f64 (*.f64 1/2 (/.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (sqrt.f64 -1))) (*.f64 -1/8 (/.f64 (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2)) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) (*.f64 l U)))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (/.f64 (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 3) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (*.f64 l l) (*.f64 U U))))) (+.f64 (/.f64 n (/.f64 Om (*.f64 (sqrt.f64 -1) (*.f64 l U)))) (fma.f64 1/2 (/.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) (sqrt.f64 -1)) (*.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 2) (*.f64 (*.f64 l U) (pow.f64 (sqrt.f64 -1) 3)))))))) |
(+.f64 (fma.f64 -1/8 (*.f64 (/.f64 Om (*.f64 (neg.f64 n) (sqrt.f64 -1))) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 l U))) (/.f64 1/2 (/.f64 (sqrt.f64 -1) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (fma.f64 1/16 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 (*.f64 n n) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (*.f64 l U) (*.f64 l U)))) (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 3))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U))))) |
(fma.f64 1/16 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 (*.f64 n n) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 (*.f64 l U) (*.f64 l U)))) (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 3))) (fma.f64 1/2 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (sqrt.f64 -1)) (fma.f64 -1/8 (*.f64 (/.f64 Om (*.f64 (neg.f64 n) (sqrt.f64 -1))) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 l U))) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U)))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 l (*.f64 n U))))) |
(/.f64 (*.f64 (*.f64 l U) (*.f64 (neg.f64 n) (sqrt.f64 -1))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) |
(fma.f64 -1 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 l (*.f64 n U)))) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om))))) |
(-.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (sqrt.f64 -1) 1/2)) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U)))) |
(+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))) |
(fma.f64 1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) Om) (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 2)) (*.f64 l (*.f64 n U))) (fma.f64 -1 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 l (*.f64 n U)))) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))))) |
(fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 -1) n) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 (/.f64 l Om) U))) (-.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (sqrt.f64 -1) 1/2)) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U))))) |
(+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 (pow.f64 Om 2) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 Om (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 2))) (*.f64 n (*.f64 l U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l U))) Om)) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))))) |
(fma.f64 1/16 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 (*.f64 Om Om) (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 3))) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U U)))) (fma.f64 1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) Om) (pow.f64 (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)) 2)) (*.f64 l (*.f64 n U))) (fma.f64 -1 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 l (*.f64 n U)))) (*.f64 1/2 (*.f64 (sqrt.f64 -1) (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 -1) (*.f64 n n)) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 3) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) (*.f64 Om Om)))) (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 -1) n) (/.f64 (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 2) (*.f64 (/.f64 l Om) U))) (-.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (sqrt.f64 -1) 1/2)) (*.f64 (/.f64 n Om) (*.f64 l (*.f64 (sqrt.f64 -1) U)))))) |
(*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om (/.f64 n l)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 l)))) |
(fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (-.f64 (*.f64 (*.f64 (/.f64 Om n) l) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) -1/2)) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om l) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (+.f64 (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) l) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om (/.f64 n l)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))) (fma.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (/.f64 (*.f64 l (*.f64 Om Om)) (*.f64 n n))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))))) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U)))))) |
(fma.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) l) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (*.f64 (/.f64 n Om) l) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 l (neg.f64 (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 -1/2 (/.f64 Om (/.f64 (/.f64 (*.f64 n n) l) Om))))))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(/.f64 (*.f64 -2 (*.f64 n (*.f64 U (*.f64 l l)))) Om) |
(/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) (*.f64 (pow.f64 l 2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 U (*.f64 l l))))) |
(*.f64 (/.f64 n Om) (*.f64 (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 (/.f64 n Om) (*.f64 (fma.f64 (/.f64 n Om) (-.f64 U* U) -2) (*.f64 l (*.f64 l U)))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 l l))))) |
(/.f64 (neg.f64 n) (/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 l (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 l l))))) |
(/.f64 (neg.f64 n) (/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 l (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 l l))))) |
(/.f64 (neg.f64 n) (/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 l (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 l l))))) |
(/.f64 (neg.f64 n) (/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 l (*.f64 l U))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) |
(*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 U (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(+.f64 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) U))) Om)) |
(+.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l U) (fma.f64 -1 (/.f64 l (/.f64 Om (*.f64 n U))) (*.f64 l -2))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 U* (*.f64 l (*.f64 l U))))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U* U) Om) (*.f64 (/.f64 n Om) (*.f64 (*.f64 l U) (-.f64 (*.f64 l -2) (*.f64 n (*.f64 (/.f64 l Om) U)))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om) |
(*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om)) |
(fma.f64 -1 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))) (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 -2 l (/.f64 (*.f64 (*.f64 U* n) l) Om)))) Om)) |
(-.f64 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l U) (*.f64 l U)) Om))) |
(fma.f64 (/.f64 n Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l U) (*.f64 l U))))) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)) |
(/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om)) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(/.f64 (*.f64 -2 (*.f64 n (*.f64 U (*.f64 l l)))) Om) |
(/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) |
(/.f64 (*.f64 -2 (*.f64 n (*.f64 U (*.f64 l l)))) Om) |
(/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(fma.f64 -2 (*.f64 (/.f64 n Om) (*.f64 l (*.f64 l U))) (*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) Om) (/.f64 (*.f64 U (-.f64 U* U)) Om))) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 (neg.f64 l) (*.f64 n U)) |
(*.f64 n (*.f64 l (neg.f64 U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(*.f64 (*.f64 U* n) l) |
(*.f64 l (*.f64 n U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(*.f64 (*.f64 U* n) l) |
(*.f64 l (*.f64 n U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 n (*.f64 l U*)) |
(*.f64 (*.f64 U* n) l) |
(*.f64 l (*.f64 n U*)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 (neg.f64 l) (*.f64 n U)) |
(*.f64 n (*.f64 l (neg.f64 U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(*.f64 -1 (*.f64 n (*.f64 l U))) |
(*.f64 (neg.f64 l) (*.f64 n U)) |
(*.f64 n (*.f64 l (neg.f64 U))) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 n (*.f64 l U*)) (*.f64 -1 (*.f64 n (*.f64 l U)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (/.f64 1 Om) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om)) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) |
(/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))))) |
(/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U))))) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (sqrt.f64 (/.f64 Om (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))) (*.f64 (neg.f64 l) (*.f64 n U)))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))))) (neg.f64 (sqrt.f64 Om))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))))) (neg.f64 (sqrt.f64 Om))) |
(*.f64 1 (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) 3/2)) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) |
(sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 1 Om))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (/.f64 1 Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) 4)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (/.f64 1 Om))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (*.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (neg.f64 (*.f64 l (*.f64 U n)))) (/.f64 1 (neg.f64 Om))) |
(*.f64 (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))) (*.f64 (*.f64 (neg.f64 l) (*.f64 n U)) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))))) (neg.f64 Om)) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (*.f64 (*.f64 l U) (/.f64 1 Om))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (cbrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n l) (/.f64 (cbrt.f64 Om) U))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 Om)) |
(*.f64 (*.f64 (/.f64 n (sqrt.f64 Om)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (/.f64 U (/.f64 (sqrt.f64 Om) l))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n l) (/.f64 (cbrt.f64 Om) U))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 Om)) |
(*.f64 (*.f64 (/.f64 n (sqrt.f64 Om)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (/.f64 U (/.f64 (sqrt.f64 Om) l))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 Om)) |
(*.f64 (*.f64 (/.f64 n (sqrt.f64 Om)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (/.f64 U (/.f64 (sqrt.f64 Om) l))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (cbrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n l) (/.f64 (cbrt.f64 Om) U))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) 2) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) (/.f64 (pow.f64 (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) 2) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 Om)) |
(*.f64 (*.f64 (/.f64 n (sqrt.f64 Om)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (/.f64 U (/.f64 (sqrt.f64 Om) l))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))))) (cbrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n l) (/.f64 (cbrt.f64 Om) U))) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) 1) (/.f64 (*.f64 l U) Om)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l U) (cbrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (cbrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n l) (/.f64 (cbrt.f64 Om) U))) |
(*.f64 (/.f64 (*.f64 n (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 Om)) (/.f64 (*.f64 l U) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))) (sqrt.f64 Om)) |
(*.f64 (*.f64 (/.f64 n (sqrt.f64 Om)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))) (/.f64 U (/.f64 (sqrt.f64 Om) l))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))))) (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))))) 4)) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) 2)) |
(fabs.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) -1) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) (neg.f64 Om))) |
(*.f64 (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l)))) (*.f64 (*.f64 (neg.f64 l) (*.f64 n U)) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))))) (neg.f64 Om)) |
(sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) 2)) |
(fabs.f64 (*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om)))) |
(log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)))) 3) (pow.f64 Om 3))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 l (/.f64 Om (*.f64 n U))) (fma.f64 l -2 (/.f64 (-.f64 U* U) (/.f64 Om (*.f64 n l))))) |
(*.f64 n (*.f64 (*.f64 l U) (/.f64 (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l))) Om))) |
(+.f64 (*.f64 (*.f64 n l) U*) (*.f64 (*.f64 n l) (neg.f64 U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(+.f64 (*.f64 U* (*.f64 n l)) (*.f64 (neg.f64 U) (*.f64 n l))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) 1) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U (+.f64 U* U) (*.f64 U* U*))) |
(/.f64 (*.f64 n l) (/.f64 (fma.f64 U (+.f64 U* U) (*.f64 U* U*)) (-.f64 (pow.f64 U* 3) (pow.f64 U 3)))) |
(/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (/.f64 (fma.f64 U (+.f64 U* U) (*.f64 U* U*)) (*.f64 n l))) |
(/.f64 (*.f64 (*.f64 n l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) |
(/.f64 (*.f64 n l) (/.f64 (+.f64 U* U) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(*.f64 (/.f64 (*.f64 n l) (+.f64 U* U)) (-.f64 (*.f64 U* U*) (*.f64 U U))) |
(/.f64 (*.f64 n l) (/.f64 (+.f64 U* U) (fma.f64 U (neg.f64 U) (*.f64 U* U*)))) |
(pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 1) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (cbrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 3) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3) 1/3) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(pow.f64 (sqrt.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 2) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(sqrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) 2)) |
(fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 l) (-.f64 U* U)) n)) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l))))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) 3)) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l (-.f64 U* U)) 3))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 l (-.f64 U* U)) 3) (pow.f64 n 3))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(expm1.f64 (log1p.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(exp.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 U* U) (*.f64 n l))) 1)) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(log1p.f64 (expm1.f64 (*.f64 (-.f64 U* U) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(fma.f64 U* (*.f64 n l) (*.f64 (neg.f64 U) (*.f64 n l))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
(fma.f64 (*.f64 n l) U* (*.f64 (*.f64 n l) (neg.f64 U))) |
(*.f64 (*.f64 n l) (-.f64 U* U)) |
Compiled 38839 to 17429 computations (55.1% saved)
73 alts after pruning (72 fresh and 1 done)
| Pruned | Kept | Total | |
|---|---|---|---|
| New | 1037 | 56 | 1093 |
| Fresh | 25 | 16 | 41 |
| Picked | 1 | 0 | 1 |
| Done | 3 | 1 | 4 |
| Total | 1066 | 73 | 1139 |
| Status | Accuracy | Program |
|---|---|---|
| 9.3% | (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 Om U))))))) | |
| 47.0% | (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) | |
| 36.6% | (pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) | |
| 34.0% | (pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) | |
| 24.0% | (pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) | |
| 35.6% | (pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) | |
| 34.2% | (pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) | |
| 36.4% | (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) | |
| 6.9% | (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) | |
| 12.0% | (/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) | |
| 12.1% | (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) | |
| 3.0% | (/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) | |
| 10.7% | (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2)))))) | |
| 6.1% | (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) | |
| 6.1% | (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) | |
| ▶ | 11.2% | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 12.7% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) | |
| 7.7% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) | |
| 31.0% | (*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) | |
| 2.5% | (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) | |
| 6.3% | (*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) | |
| 22.3% | (*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) | |
| 22.5% | (*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) | |
| 26.6% | (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) | |
| 25.4% | (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) | |
| 8.9% | (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) | |
| 8.5% | (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) | |
| 9.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) | |
| 10.5% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) | |
| 6.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om)))) | |
| 5.4% | (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) | |
| 5.8% | (*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) | |
| 13.4% | (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) | |
| ▶ | 7.5% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
| 13.6% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) | |
| 7.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) | |
| 13.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) | |
| 36.7% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) | |
| 35.8% | (sqrt.f64 (pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) 2)) (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) | |
| 2.8% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) | |
| 5.9% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) | |
| 5.4% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) | |
| 6.5% | (sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) | |
| ▶ | 10.4% | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 7.7% | (sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) | |
| 8.0% | (sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) | |
| 13.3% | (sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) | |
| 39.6% | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) | |
| ▶ | 38.6% | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 15.2% | (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) | |
| 15.2% | (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) | |
| 43.0% | (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) | |
| 7.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) | |
| 14.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))))) | |
| 9.5% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) | |
| 13.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) | |
| 11.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) | |
| 12.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) | |
| 6.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) | |
| 43.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) | |
| ✓ | 36.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 42.4% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) | |
| 12.9% | (sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) | |
| ▶ | 47.3% | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 4.9% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) | |
| 5.8% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) | |
| 10.6% | (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) | |
| 42.4% | (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) | |
| 7.0% | (sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) | |
| 22.7% | (sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) | |
| 10.8% | (neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) | |
| 4.9% | (exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) | |
| 34.4% | (exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
Compiled 3764 to 2609 computations (30.7% saved)
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 92.5% | (/.f64 (*.f64 n (*.f64 l U*)) Om) |
| 90.1% | (*.f64 n (*.f64 U t)) | |
| 89.5% | (*.f64 n (*.f64 l U)) | |
| ✓ | 65.9% | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
Compiled 165 to 45 computations (72.7% saved)
30 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 2.0ms | n | @ | inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 2.0ms | l | @ | -inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 2.0ms | n | @ | 0 | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 2.0ms | U* | @ | inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 1.0ms | n | @ | -inf | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 1× | batch-egg-rewrite |
| 570× | add-sqr-sqrt |
| 558× | pow1 |
| 558× | *-un-lft-identity |
| 544× | associate-*r* |
| 524× | add-exp-log |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 25 | 94 |
| 1 | 552 | 94 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) (sqrt.f64 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 n (/.f64 1 (/.f64 (/.f64 Om l) U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 n (*.f64 (*.f64 l U*) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (*.f64 l U*) (*.f64 n (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (*.f64 n (*.f64 l U*)) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 1 (/.f64 n (/.f64 (/.f64 Om l) U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (*.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (*.f64 (*.f64 l U*) (neg.f64 n)) (/.f64 1 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 1 Om) (*.f64 n (*.f64 l U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (*.f64 n l) (*.f64 U* (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 l U*)) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 n 1) (/.f64 (*.f64 l U*) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 n (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l U*) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 n (sqrt.f64 Om)) (/.f64 (*.f64 l U*) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 l U*) (sqrt.f64 Om)) (/.f64 n (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 l U*) 1) (/.f64 n Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 n Om) (*.f64 l U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 (*.f64 Om Om))) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 n l) 1) (/.f64 U* Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 n l) (cbrt.f64 (*.f64 Om Om))) (/.f64 U* (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((*.f64 (/.f64 (*.f64 n l) (sqrt.f64 Om)) (/.f64 U* (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((pow.f64 (/.f64 Om (*.f64 n (*.f64 l U*))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((neg.f64 (/.f64 (*.f64 n (*.f64 l U*)) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((sqrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log.f64 (exp.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((cbrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((expm1.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((exp.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f)) ((log1p.f64 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (/.f64 (*.f64 n (*.f64 l U*)) Om)) #f))) |
| 1× | egg-herbie |
| 960× | associate-*r* |
| 916× | associate-*l* |
| 786× | *-commutative |
| 698× | times-frac |
| 682× | associate-/l* |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 548 | 11023 |
| 1 | 1663 | 10835 |
| 2 | 6919 | 10771 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 5) (pow.f64 U* 5)))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U)))))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 3) (pow.f64 U 3)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 5) (pow.f64 U 5)))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 3) (pow.f64 U 3)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U)))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 l 3) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))))))) |
(+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 l 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 l 3) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3)))))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 5))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3)))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om)))))))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))))))))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 5))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om)))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 6) (*.f64 (pow.f64 l 6) (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 5)))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 U* 3))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(*.f64 (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) (sqrt.f64 2)) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) |
(pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 3) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) 1) |
(*.f64 n (/.f64 1 (/.f64 (/.f64 Om l) U*))) |
(*.f64 n (*.f64 (*.f64 l U*) (/.f64 1 Om))) |
(*.f64 (*.f64 l U*) (*.f64 n (/.f64 1 Om))) |
(*.f64 (*.f64 n (*.f64 l U*)) (/.f64 1 Om)) |
(*.f64 1 (/.f64 n (/.f64 (/.f64 Om l) U*))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (*.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 (*.f64 l U*) (neg.f64 n)) (/.f64 1 (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 l U*))) |
(*.f64 (*.f64 n l) (*.f64 U* (/.f64 1 Om))) |
(*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 l U*)) (sqrt.f64 Om))) |
(*.f64 (/.f64 n 1) (/.f64 (*.f64 l U*) Om)) |
(*.f64 (/.f64 n (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l U*) (cbrt.f64 Om))) |
(*.f64 (/.f64 n (sqrt.f64 Om)) (/.f64 (*.f64 l U*) (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l U*) (sqrt.f64 Om)) (/.f64 n (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l U*) 1) (/.f64 n Om)) |
(*.f64 (/.f64 n Om) (*.f64 l U*)) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 (*.f64 Om Om))) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n l) 1) (/.f64 U* Om)) |
(*.f64 (/.f64 (*.f64 n l) (cbrt.f64 (*.f64 Om Om))) (/.f64 U* (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n l) (sqrt.f64 Om)) (/.f64 U* (sqrt.f64 Om))) |
(pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 1) |
(pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 3) |
(pow.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) |
(pow.f64 (/.f64 Om (*.f64 n (*.f64 l U*))) -1) |
(neg.f64 (/.f64 (*.f64 n (*.f64 l U*)) (neg.f64 Om))) |
(sqrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 2)) |
(log.f64 (exp.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))))) |
(cbrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3)) |
(expm1.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(exp.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U U*)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U U*)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U 3)) (pow.f64 U* 3)))) (*.f64 n (pow.f64 l 3)))))) |
(fma.f64 1/2 (/.f64 (*.f64 Om (*.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*)))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (/.f64 (*.f64 n (pow.f64 l 3)) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) 2))))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 5) (pow.f64 U* 5)))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))))))) |
(fma.f64 1/16 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 5)) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 3)) (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U* 5)) (pow.f64 U 5)))) (*.f64 (*.f64 n n) (pow.f64 l 5))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U))))))) (sqrt.f64 (/.f64 1 (*.f64 U U*)))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (pow.f64 (fma.f64 t U (*.f64 -2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U 3)) (pow.f64 U* 3)))) (*.f64 n (pow.f64 l 3))))))) |
(fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (*.f64 (/.f64 (pow.f64 Om 5) (/.f64 (pow.f64 l 5) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) 3))) (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U* 5)) (pow.f64 U 5))))) (fma.f64 1/2 (/.f64 (*.f64 Om (*.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*)))) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))) (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (/.f64 (*.f64 n (pow.f64 l 3)) (pow.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) 2)))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)))) |
(+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U)))))) |
(fma.f64 -1 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))))))))) |
(-.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 3) (pow.f64 U 3)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U))))))) |
(fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U 3)) (pow.f64 U* 3))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (*.f64 n (pow.f64 l 3)))) (fma.f64 -1 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U))))))))))) |
(fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 2) (/.f64 (pow.f64 l 3) (pow.f64 Om 3))))) (-.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))))) |
(+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 3))) (*.f64 (pow.f64 n 2) (pow.f64 l 5))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 5) (pow.f64 U 5)))))) (+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))) 2))) (*.f64 n (pow.f64 l 3))) (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U* 3) (pow.f64 U 3)))))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 -1 (*.f64 t U)) (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U* U)))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U* 5)) (pow.f64 U 5))) (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 3)) (pow.f64 l 5)))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U 3)) (pow.f64 U* 3))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 Om 3)) (pow.f64 (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))) 2)) (*.f64 n (pow.f64 l 3)))) (fma.f64 -1 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 l (*.f64 Om (fma.f64 -1 (*.f64 U t) (*.f64 2 (/.f64 (*.f64 l l) (/.f64 Om U)))))))))))) |
(fma.f64 1/16 (*.f64 (*.f64 (sqrt.f64 (/.f64 (/.f64 1 (pow.f64 U* 5)) (pow.f64 U 5))) (/.f64 (sqrt.f64 2) (*.f64 n n))) (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 3) (/.f64 (pow.f64 l 5) (pow.f64 Om 5)))) (fma.f64 1/8 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 U 3) (pow.f64 U* 3)))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) 2) (/.f64 (pow.f64 l 3) (pow.f64 Om 3))))) (-.f64 (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) (/.f64 Om U)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))) Om)) (*.f64 (*.f64 1/2 (*.f64 (sqrt.f64 2) t)) (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 n Om) U) l) (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om))) (*.f64 (sqrt.f64 (*.f64 (/.f64 n l) (/.f64 Om (/.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) U)))) (*.f64 1/2 (*.f64 (sqrt.f64 2) t)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 l 3) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))) Om)) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 t t) (sqrt.f64 (/.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 l 3)) (pow.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) 3))))) (*.f64 (*.f64 1/2 (*.f64 (sqrt.f64 2) t)) (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 n Om) U) l) (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om))) (fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (*.f64 (/.f64 n l) (/.f64 Om (/.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) U)))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 (/.f64 n (pow.f64 l 3)) (*.f64 U (pow.f64 Om 3))) (pow.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) 3))) (*.f64 (*.f64 -1/8 (*.f64 t t)) (sqrt.f64 2))))) |
(+.f64 (*.f64 1/16 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (*.f64 (pow.f64 l 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 5)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) (+.f64 (*.f64 -1/8 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (*.f64 (pow.f64 l 3) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))))) (*.f64 1/2 (*.f64 (*.f64 (sqrt.f64 2) t) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)))))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 n (pow.f64 Om 5)) U) (pow.f64 l 5)) (pow.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) 5))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 U (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))) Om)) (fma.f64 -1/8 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 t t) (sqrt.f64 (/.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 l 3)) (pow.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) 3))))) (*.f64 (*.f64 1/2 (*.f64 (sqrt.f64 2) t)) (sqrt.f64 (/.f64 (/.f64 (*.f64 (*.f64 n Om) U) l) (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 t 3) (sqrt.f64 (/.f64 (/.f64 n (/.f64 (pow.f64 l 5) (*.f64 U (pow.f64 Om 5)))) (pow.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) 5))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om))) (fma.f64 1/2 (*.f64 (sqrt.f64 2) (*.f64 t (sqrt.f64 (*.f64 (/.f64 n l) (/.f64 Om (/.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) U)))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 (/.f64 n (pow.f64 l 3)) (*.f64 U (pow.f64 Om 3))) (pow.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) 3))) (*.f64 (*.f64 -1/8 (*.f64 t t)) (sqrt.f64 2)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (+.f64 (/.f64 n (/.f64 Om U*)) -2)) (sqrt.f64 (/.f64 n (/.f64 t U)))) Om))) |
(fma.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 l l) (*.f64 (sqrt.f64 2) (+.f64 -2 (*.f64 U* (/.f64 n Om))))) (sqrt.f64 (*.f64 (/.f64 n t) U))) Om) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))))) |
(fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (fma.f64 U* (/.f64 n Om) -2))) (sqrt.f64 (*.f64 (/.f64 n t) U))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (+.f64 (/.f64 n (/.f64 Om U*)) -2)) (sqrt.f64 (/.f64 n (/.f64 t U)))) Om) (*.f64 (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 2)) (*.f64 Om Om))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (*.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 l l) (*.f64 (sqrt.f64 2) (+.f64 -2 (*.f64 U* (/.f64 n Om))))) (sqrt.f64 (*.f64 (/.f64 n t) U))) Om)))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (fma.f64 U* (/.f64 n Om) -2))) (sqrt.f64 (*.f64 (/.f64 n t) U))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 (*.f64 Om Om) (pow.f64 l 4)) (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 2))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))) -1/8)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n U*) Om) 2))) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 5))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (+.f64 (/.f64 n (/.f64 Om U*)) -2)) (sqrt.f64 (/.f64 n (/.f64 t U)))) Om) (fma.f64 1/16 (/.f64 (*.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 6)) (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 3)) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 5) U)))) (pow.f64 Om 3)) (*.f64 (*.f64 -1/8 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 4)) (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 2)) (*.f64 Om Om))) (sqrt.f64 (/.f64 (*.f64 n U) (pow.f64 t 3))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 1/2 (/.f64 (*.f64 (*.f64 (*.f64 l l) (*.f64 (sqrt.f64 2) (+.f64 -2 (*.f64 U* (/.f64 n Om))))) (sqrt.f64 (*.f64 (/.f64 n t) U))) Om) (fma.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 2) (*.f64 (sqrt.f64 2) (pow.f64 l 4))) (/.f64 (*.f64 Om Om) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))))) (*.f64 1/16 (/.f64 (*.f64 (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 3) (*.f64 (sqrt.f64 2) (pow.f64 l 6))) (/.f64 (pow.f64 Om 3) (sqrt.f64 (/.f64 U (/.f64 (pow.f64 t 5) n))))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l l)) (/.f64 Om (fma.f64 U* (/.f64 n Om) -2))) (sqrt.f64 (*.f64 (/.f64 n t) U))) (fma.f64 1/16 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 3)) (*.f64 (pow.f64 l 6) (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 3))) (sqrt.f64 (/.f64 U (/.f64 (pow.f64 t 5) n)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 (*.f64 Om Om) (pow.f64 l 4)) (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 2))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 t 3) U))) -1/8))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 U* (/.f64 n Om) -2)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om)))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2)))))))) |
(fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (+.f64 -2 (*.f64 U* (/.f64 n Om))))) (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 l t)))) |
(fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 U* (/.f64 n Om) -2))))) (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) t) (/.f64 l (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (fma.f64 U* (/.f64 n Om) -2))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2))))) (*.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 3)))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) l) t) (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (+.f64 -2 (*.f64 U* (/.f64 n Om)))))) (fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (*.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 3)) (*.f64 U (pow.f64 Om 3)))) -1/8)))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) t) (/.f64 l (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (fma.f64 U* (/.f64 n Om) -2))))) (fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 U* (/.f64 n Om) -2))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (*.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 3)) (*.f64 U (pow.f64 Om 3)))) -1/8)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) (+.f64 (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (pow.f64 l 5)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 5))))) (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (pow.f64 l 3)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) 3)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2))))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 l 5) (pow.f64 t 3))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 5) (*.f64 U (pow.f64 Om 5)))))) (*.f64 (*.f64 -1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 t t)) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 U (pow.f64 Om 3))) (pow.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) 3))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) l) t) (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (+.f64 -2 (*.f64 U* (/.f64 n Om)))))) (fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 3)) (*.f64 U (pow.f64 Om 3))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 -2 (*.f64 U* (/.f64 n Om))) 5) (*.f64 U (pow.f64 Om 5))))) (*.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (pow.f64 t 3))))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) t) (/.f64 l (sqrt.f64 (/.f64 (*.f64 Om (*.f64 n U)) (fma.f64 U* (/.f64 n Om) -2))))) (fma.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (fma.f64 U* (/.f64 n Om) -2))))) (fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 3)) (*.f64 U (pow.f64 Om 3))))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (fma.f64 U* (/.f64 n Om) -2) 5) (*.f64 U (pow.f64 Om 5))))) (*.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 5)) (pow.f64 t 3))))))) |
(*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) |
(neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*))))))))))) |
(*.f64 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 -1))) (neg.f64 (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 U* (/.f64 n Om)))))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om)))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))))))))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l))) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) (*.f64 Om U)))))) |
(-.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n (-.f64 2 (*.f64 U* (/.f64 n Om)))) (*.f64 Om U))) (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) l) (/.f64 t (sqrt.f64 -1))))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 U* (/.f64 n Om)))))))))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))))))))) |
(fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (pow.f64 l 3) (pow.f64 (sqrt.f64 -1) 3)) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) 3) (*.f64 U (pow.f64 Om 3)))))) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))))))))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l))) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) (*.f64 Om U))))))) |
(fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (-.f64 2 (*.f64 U* (/.f64 n Om))) 3) (*.f64 U (pow.f64 Om 3))))) (*.f64 -1 (sqrt.f64 -1)))) (-.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n (-.f64 2 (*.f64 U* (/.f64 n Om)))) (*.f64 Om U))) (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) l) (/.f64 t (sqrt.f64 -1))))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 U* (/.f64 n Om))))))))))) |
(+.f64 (*.f64 1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 2)) (*.f64 (pow.f64 (sqrt.f64 -1) 3) (pow.f64 l 3))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 3))))) (+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) U)) Om)))) (+.f64 (*.f64 -1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 t 3)) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 l 5))) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 5) U)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om))) 5))))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) (*.f64 (sqrt.f64 -1) l)) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n U*) Om)))))))))) |
(fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (pow.f64 l 3) (pow.f64 (sqrt.f64 -1) 3)) (*.f64 t t))) (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) 3) (*.f64 U (pow.f64 Om 3)))))) (fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l (sqrt.f64 -1)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))))))))) (fma.f64 -1/16 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (pow.f64 l 5) (pow.f64 (sqrt.f64 -1) 5)) (pow.f64 t 3))) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (pow.f64 Om 5)) U) (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) 5)))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 -1)) (/.f64 t l))) (sqrt.f64 (/.f64 n (/.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om U*)))) (*.f64 Om U)))))))) |
(fma.f64 1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 l 3)) (*.f64 t t)) (/.f64 (sqrt.f64 (/.f64 n (/.f64 (pow.f64 (-.f64 2 (*.f64 U* (/.f64 n Om))) 3) (*.f64 U (pow.f64 Om 3))))) (*.f64 -1 (sqrt.f64 -1)))) (-.f64 (fma.f64 -1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) l) t) (/.f64 (sqrt.f64 (*.f64 (/.f64 n (-.f64 2 (*.f64 U* (/.f64 n Om)))) (*.f64 Om U))) (sqrt.f64 -1))) (*.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 (-.f64 2 (*.f64 U* (/.f64 n Om))) 5)) (*.f64 U (pow.f64 Om 5)))) (/.f64 (*.f64 -1/16 (sqrt.f64 2)) (/.f64 (pow.f64 l 5) (/.f64 (pow.f64 t 3) (pow.f64 (sqrt.f64 -1) 5)))))) (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 -1) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (-.f64 2 (*.f64 U* (/.f64 n Om))))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))))) (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U)))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U)))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U)))) (*.f64 (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) Om) (/.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) Om))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 n 4)) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U U) (*.f64 U* U*)))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U))) 3)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))))) (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U)))))) (*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U))))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 4)) (*.f64 (*.f64 U (*.f64 U (*.f64 U* U*))) (*.f64 (pow.f64 l 4) (pow.f64 n 4)))) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))) 3)))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U)))) (*.f64 (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) Om) (/.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) Om)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 4) (*.f64 (pow.f64 U 2) (pow.f64 U* 2))))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 3))))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*)))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 n 6) (*.f64 (pow.f64 l 6) (*.f64 (pow.f64 U 3) (pow.f64 U* 3))))) (pow.f64 Om 6)) (sqrt.f64 (/.f64 1 (pow.f64 (+.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 n (*.f64 t U))) 5)))))))) |
(fma.f64 -1/8 (*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 n 4)) (*.f64 (pow.f64 l 4) (*.f64 (*.f64 U U) (*.f64 U* U*)))) (pow.f64 Om 4)) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U))) 3)))) (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))))) (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U)))) (*.f64 (*.f64 1/16 (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (pow.f64 n 6)) (*.f64 (*.f64 (pow.f64 l 6) (pow.f64 U 3)) (pow.f64 U* 3))) (pow.f64 Om 6))) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 n U))) 5))))))) |
(fma.f64 -1/8 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 4)) (*.f64 (*.f64 U (*.f64 U (*.f64 U* U*))) (*.f64 (pow.f64 l 4) (pow.f64 n 4)))) (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))) 3)))) (fma.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (/.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) Om)) (sqrt.f64 (/.f64 1 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U)))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U)))) (*.f64 (sqrt.f64 (/.f64 1 (pow.f64 (fma.f64 -2 (/.f64 n (/.f64 (/.f64 Om U) (*.f64 l l))) (*.f64 t (*.f64 n U))) 5))) (*.f64 1/16 (/.f64 (sqrt.f64 2) (/.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 6)) (*.f64 (pow.f64 U 3) (*.f64 (pow.f64 U* 3) (pow.f64 l 6)))))))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*)))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)))) |
(-.f64 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n l) (*.f64 Om (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))))) |
(-.f64 (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U U*)) (neg.f64 l)) 2)) (*.f64 (sqrt.f64 2) Om)) n) (/.f64 (sqrt.f64 (/.f64 (/.f64 1 U) U*)) l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*))))) |
(+.f64 (*.f64 -1 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U U*)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 n l)) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (-.f64 (*.f64 n (*.f64 t U)) (pow.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))) (*.f64 (pow.f64 n 2) l)) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 U* 3))))))))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*)))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 1 (*.f64 U U*))) (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n l) (*.f64 Om (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2)))))) (fma.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*)) (*.f64 1/2 (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (*.f64 Om Om) (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (neg.f64 (*.f64 l (sqrt.f64 (/.f64 U U*)))) 2))) l)) (sqrt.f64 (/.f64 1 (*.f64 U (pow.f64 U* 3))))))))) |
(-.f64 (fma.f64 1/2 (*.f64 (/.f64 (*.f64 (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U U*)) (neg.f64 l)) 2)) (*.f64 (sqrt.f64 2) Om)) n) (/.f64 (sqrt.f64 (/.f64 (/.f64 1 U) U*)) l)) (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) l) (/.f64 (-.f64 (*.f64 t (*.f64 n U)) (pow.f64 (*.f64 (sqrt.f64 (/.f64 U U*)) (neg.f64 l)) 2)) (*.f64 n n))) (*.f64 (sqrt.f64 (/.f64 (/.f64 1 U) (pow.f64 U* 3))) 1/2)))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U U*))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U)))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(-.f64 (fma.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))) (+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 (*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2))) 2)) (pow.f64 l 2))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 (*.f64 n (pow.f64 t 3)) U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (-.f64 (*.f64 1/2 (fma.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 t 3) (*.f64 n U)))) (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 3)) (*.f64 l (*.f64 l (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U)))) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))))) |
(-.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U)))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om)) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U)))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (neg.f64 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l))))))) |
(-.f64 (fma.f64 (/.f64 (*.f64 1/2 (sqrt.f64 2)) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U)))) (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om)) |
(+.f64 (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) (+.f64 (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (pow.f64 l 2)) Om) (sqrt.f64 (/.f64 (*.f64 n U) t)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 l 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2)))) (pow.f64 Om 3)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 (pow.f64 t 3) U)))))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (-.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n U) t)) (pow.f64 l 2)) 2))) (pow.f64 Om 2)) (sqrt.f64 (/.f64 1 (*.f64 n (*.f64 t U))))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 Om Om) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2)))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))) (fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (fma.f64 -1 (*.f64 (sqrt.f64 (/.f64 n (/.f64 t U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 l l)))) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (-.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 U U*) (*.f64 l l))) (pow.f64 (neg.f64 (*.f64 (*.f64 l l) (sqrt.f64 (/.f64 n (/.f64 t U))))) 2))))) (sqrt.f64 (/.f64 1 (*.f64 (*.f64 n (pow.f64 t 3)) U)))))))) |
(fma.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 t (*.f64 n U))) (-.f64 (*.f64 1/2 (fma.f64 (sqrt.f64 (/.f64 1 (*.f64 (pow.f64 t 3) (*.f64 n U)))) (*.f64 (/.f64 (sqrt.f64 2) (pow.f64 Om 3)) (*.f64 l (*.f64 l (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2))))) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 Om Om)) (-.f64 (*.f64 n (*.f64 n (*.f64 U* (*.f64 l (*.f64 l U))))) (pow.f64 (*.f64 (*.f64 l l) (sqrt.f64 (*.f64 (/.f64 n t) U))) 2))) (sqrt.f64 (/.f64 1 (*.f64 t (*.f64 n U))))))) (/.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 n t) U)) (*.f64 (sqrt.f64 2) (*.f64 l l))) Om))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) 1) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 1 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))))) |
(*.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))))) |
(*.f64 (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) (sqrt.f64 2)) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4)) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 4 (pow.f64 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))) 2)))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 4 (pow.f64 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))) 2)))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 (pow.f64 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))) 2) 4)) 1/2) (pow.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 4 (pow.f64 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))) 2)))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 4 (pow.f64 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))) 2)))) (sqrt.f64 (cbrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))))) |
(pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/2) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(pow.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 3) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U)))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 1/4) 2) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(fabs.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))) 1/2)) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n)))))) 1)) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) U*))) (/.f64 (*.f64 U l) (/.f64 Om n)) (*.f64 t (*.f64 U n))))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 l -2 (*.f64 (*.f64 l U*) (/.f64 n Om))) (*.f64 (/.f64 (*.f64 l U) Om) n) (*.f64 t (*.f64 n U))))) |
(sqrt.f64 (*.f64 2 (fma.f64 (fma.f64 n (/.f64 U* (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 (*.f64 l U) n) Om) (*.f64 t (*.f64 n U))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) 1) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 n (/.f64 1 (/.f64 (/.f64 Om l) U*))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 n (*.f64 (*.f64 l U*) (/.f64 1 Om))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (*.f64 l U*) (*.f64 n (/.f64 1 Om))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (*.f64 n (*.f64 l U*)) (/.f64 1 Om)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 1 (/.f64 n (/.f64 (/.f64 Om l) U*))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (*.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (*.f64 (/.f64 1 Om) (cbrt.f64 (*.f64 n (*.f64 l U*))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (/.f64 1 Om))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (*.f64 (*.f64 l U*) (neg.f64 n)) (/.f64 1 (neg.f64 Om))) |
(*.f64 (*.f64 l U*) (*.f64 (neg.f64 n) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (*.f64 l U*) (/.f64 (neg.f64 Om) (neg.f64 n))) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 l U*))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (*.f64 n l) (*.f64 U* (/.f64 1 Om))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 1 (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) |
(/.f64 (*.f64 1 (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) (cbrt.f64 (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 l U*)) (sqrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 n (/.f64 (sqrt.f64 Om) (*.f64 l U*)))) |
(/.f64 n (/.f64 (sqrt.f64 Om) (/.f64 l (/.f64 (sqrt.f64 Om) U*)))) |
(*.f64 (/.f64 n 1) (/.f64 (*.f64 l U*) Om)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 n (cbrt.f64 (*.f64 Om Om))) (/.f64 (*.f64 l U*) (cbrt.f64 Om))) |
(/.f64 (*.f64 1 (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) (cbrt.f64 (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(*.f64 (/.f64 n (sqrt.f64 Om)) (/.f64 (*.f64 l U*) (sqrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 n (/.f64 (sqrt.f64 Om) (*.f64 l U*)))) |
(/.f64 n (/.f64 (sqrt.f64 Om) (/.f64 l (/.f64 (sqrt.f64 Om) U*)))) |
(*.f64 (/.f64 (*.f64 l U*) (sqrt.f64 Om)) (/.f64 n (sqrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 n (/.f64 (sqrt.f64 Om) (*.f64 l U*)))) |
(/.f64 n (/.f64 (sqrt.f64 Om) (/.f64 l (/.f64 (sqrt.f64 Om) U*)))) |
(*.f64 (/.f64 (*.f64 l U*) 1) (/.f64 n Om)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 n Om) (*.f64 l U*)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(/.f64 (*.f64 1 (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) (cbrt.f64 (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (*.f64 (/.f64 1 Om) (cbrt.f64 (*.f64 n (*.f64 l U*))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(/.f64 (*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (cbrt.f64 (*.f64 (*.f64 l U*) (/.f64 n Om)))) (cbrt.f64 (*.f64 Om Om))) |
(/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (/.f64 (cbrt.f64 (*.f64 Om Om)) (cbrt.f64 (*.f64 n (/.f64 U* (/.f64 Om l)))))) |
(*.f64 (/.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l U*)) 2)) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 l U*))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) Om)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 (*.f64 Om Om))) (/.f64 (sqrt.f64 (*.f64 n (*.f64 l U*))) (cbrt.f64 Om))) |
(/.f64 (*.f64 1 (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) (cbrt.f64 (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n l) 1) (/.f64 U* Om)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(*.f64 (/.f64 (*.f64 n l) (cbrt.f64 (*.f64 Om Om))) (/.f64 U* (cbrt.f64 Om))) |
(/.f64 (*.f64 1 (/.f64 (*.f64 n (*.f64 l U*)) (cbrt.f64 Om))) (cbrt.f64 (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 l U*) (cbrt.f64 (*.f64 Om Om))) (/.f64 n (cbrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 n l) (sqrt.f64 Om)) (/.f64 U* (sqrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 n (/.f64 (sqrt.f64 Om) (*.f64 l U*)))) |
(/.f64 n (/.f64 (sqrt.f64 Om) (/.f64 l (/.f64 (sqrt.f64 Om) U*)))) |
(pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 1) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(pow.f64 (cbrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 3) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(pow.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3) 1/3) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(pow.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 2) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(pow.f64 (/.f64 Om (*.f64 n (*.f64 l U*))) -1) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 l U*)) (neg.f64 Om))) |
(*.f64 (*.f64 l U*) (*.f64 (neg.f64 n) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (*.f64 l U*) (/.f64 (neg.f64 Om) (neg.f64 n))) |
(sqrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 2)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(log.f64 (exp.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(cbrt.f64 (pow.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)) 3)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(expm1.f64 (log1p.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(exp.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(exp.f64 (*.f64 (log.f64 (/.f64 n (/.f64 (/.f64 Om l) U*))) 1)) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
(log1p.f64 (expm1.f64 (/.f64 n (/.f64 (/.f64 Om l) U*)))) |
(*.f64 (*.f64 l U*) (/.f64 n Om)) |
(*.f64 n (/.f64 U* (/.f64 Om l))) |
Found 2 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 92.8% | (*.f64 (*.f64 n U) (*.f64 2 t)) |
| ✓ | 72.8% | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
Compiled 31 to 17 computations (45.2% saved)
18 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 0.0ms | n | @ | 0 | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 0.0ms | n | @ | -inf | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 0.0ms | t | @ | -inf | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 0.0ms | n | @ | inf | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 0.0ms | t | @ | 0 | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 1× | batch-egg-rewrite |
| 1142× | log-prod |
| 892× | prod-exp |
| 832× | exp-prod |
| 804× | pow-prod-down |
| 542× | pow-prod-up |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 11 | 42 |
| 1 | 221 | 42 |
| 2 | 2612 | 42 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(*.f64 (*.f64 n U) (*.f64 2 t)) |
| Outputs |
|---|
(((+.f64 0 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (+.f64 t t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 U (+.f64 t t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f))) |
(((+.f64 0 (*.f64 n (*.f64 U (+.f64 t t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 2/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 n U)) (*.f64 (log.f64 (+.f64 t t)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (log.f64 (+.f64 t t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (*.f64 (log.f64 (+.f64 t t)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 t) 1) (log.f64 (*.f64 n (*.f64 U 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (+.f64 t t)) (*.f64 (log.f64 (*.f64 n U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (log.f64 (*.f64 n U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (*.f64 (log.f64 (*.f64 n U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 U 2))) (*.f64 (log.f64 t) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 U (+.f64 t t))) (*.f64 (log.f64 n) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (*.f64 (*.f64 n U) (*.f64 2 t))) #f))) |
| 1× | egg-herbie |
| 1160× | log-prod |
| 1094× | fma-def |
| 1070× | exp-sum |
| 980× | unswap-sqr |
| 916× | distribute-lft-in |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 217 | 2840 |
| 1 | 454 | 2764 |
| 2 | 1229 | 2764 |
| 3 | 6668 | 2764 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 0 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4)) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (+.f64 t t))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 U (+.f64 t t)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/6) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(fabs.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1/2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) 3)) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(+.f64 0 (*.f64 n (*.f64 U (+.f64 t t)))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) |
(pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 6) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 2/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 4) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 2)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 3)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) 1/2)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) |
(exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 U (+.f64 t t))))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n U)) (*.f64 (log.f64 (+.f64 t t)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (log.f64 (+.f64 t t)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (*.f64 (log.f64 (+.f64 t t)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 t) 1) (log.f64 (*.f64 n (*.f64 U 2))))) |
(exp.f64 (+.f64 (log.f64 (+.f64 t t)) (*.f64 (log.f64 (*.f64 n U)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (log.f64 (*.f64 n U)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (*.f64 (log.f64 (*.f64 n U)) 1))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 U 2))) (*.f64 (log.f64 t) 1))) |
(exp.f64 (+.f64 (log.f64 (*.f64 U (+.f64 t t))) (*.f64 (log.f64 n) 1))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
| Outputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(+.f64 0 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) |
(*.f64 3 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(*.f64 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n))))))) 3) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 1) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 1 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (+.f64 t t))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 U (+.f64 t t)))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 2 (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 2 U))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n U))) (sqrt.f64 t)) |
(pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/2) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 1/3) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/6) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n))))))) |
(fabs.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1/2)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 1)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 1)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6)) 3)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 U (*.f64 t (*.f64 2 n)))) |
(+.f64 0 (*.f64 n (*.f64 U (+.f64 t t)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) |
(*.f64 3 (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 6) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3/2) 2/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3) 1/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 4) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 U (*.f64 t (*.f64 2 n))))) 2)) (cbrt.f64 (log.f64 (*.f64 U (*.f64 t (*.f64 2 n)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 U (*.f64 t (*.f64 2 n)))))) (sqrt.f64 (log.f64 (*.f64 U (*.f64 t (*.f64 2 n)))))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 U) 2) n) t)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2)) 1/2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1/3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 U (+.f64 t t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n U)) (*.f64 (log.f64 (+.f64 t t)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (log.f64 (+.f64 t t)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n U)) 1) (*.f64 (log.f64 (+.f64 t t)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 t) 1) (log.f64 (*.f64 n (*.f64 U 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (+.f64 t t)) (*.f64 (log.f64 (*.f64 n U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (log.f64 (*.f64 n U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 t t)) 1) (*.f64 (log.f64 (*.f64 n U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t t))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 U 2))) (*.f64 (log.f64 t) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 U (+.f64 t t))) (*.f64 (log.f64 n) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 U (*.f64 t (*.f64 2 n))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 89.5% | (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
| ✓ | 88.1% | (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) |
| ✓ | 85.1% | (*.f64 n (*.f64 l l)) |
| ✓ | 56.0% | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
Compiled 129 to 36 computations (72.1% saved)
51 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 61.0ms | n | @ | 0 | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 4.0ms | n | @ | inf | (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
| 2.0ms | U | @ | 0 | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 2.0ms | l | @ | 0 | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 2.0ms | U* | @ | inf | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 1× | batch-egg-rewrite |
| 1068× | prod-diff |
| 840× | expm1-udef |
| 484× | add-sqr-sqrt |
| 472× | pow1 |
| 472× | *-un-lft-identity |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 21 | 182 |
| 1 | 469 | 182 |
| 2 | 6722 | 182 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(*.f64 n (*.f64 l l)) |
(*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) |
(/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 -2) (pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 (/.f64 -2 Om) 1/2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 1 (sqrt.f64 (*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) -1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (*.f64 n (*.f64 l l)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 l l))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (*.f64 l (sqrt.f64 n)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((sqrt.f64 (*.f64 (pow.f64 l 4) (*.f64 n n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 l) l) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l l) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 n 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 l l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l l))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 l l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f))) |
(((+.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) 2) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((+.f64 (*.f64 2 (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))) (*.f64 U (*.f64 n (*.f64 l l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (*.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((/.f64 (*.f64 (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (pow.f64 (exp.f64 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3) (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 Om (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 1 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 1 U) (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 1 (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 Om (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (cbrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 (cbrt.f64 Om) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f)) ((log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (*.f64 n (*.f64 l l)) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) #f))) |
| 1× | egg-herbie |
| 1598× | associate-*r* |
| 1392× | associate-*l* |
| 1310× | times-frac |
| 594× | fma-def |
| 526× | associate-*r/ |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 711 | 22894 |
| 1 | 2187 | 22400 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U))))) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3) (sqrt.f64 -2)))) (*.f64 (pow.f64 n 2) (pow.f64 U 2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U)))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 U 2))))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) |
(+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5)))))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 5) (pow.f64 Om 7)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 3))))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2)))))))) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om)) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om)) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) |
(-.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U 2)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 4))))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 -1/16 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U)))))) |
(/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))) (*.f64 -8 (/.f64 Om (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4) U)))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 Om (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 Om (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U* 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 4) (*.f64 (pow.f64 l 2) U))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) 1) |
(*.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(*.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(*.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4)) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) |
(*.f64 (sqrt.f64 -2) (pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) 1/2)) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) |
(*.f64 (pow.f64 (/.f64 -2 Om) 1/2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) -1/2))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 -2))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 3) |
(pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))))) |
(cbrt.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) 1) |
(pow.f64 (*.f64 n (*.f64 l l)) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l l))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3) 1/3) |
(pow.f64 (*.f64 l (sqrt.f64 n)) 2) |
(sqrt.f64 (*.f64 (pow.f64 l 4) (*.f64 n n))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 l) l) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l l))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l l) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 n 3))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l l)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l l))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l l)))) |
(+.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) 2) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))))) |
(+.f64 (*.f64 2 (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))) (*.f64 U (*.f64 n (*.f64 l l))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1) |
(/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(/.f64 (*.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (*.f64 (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 1) |
(pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3) 1/3) |
(pow.f64 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)) 2) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 2)) |
(log.f64 (pow.f64 (exp.f64 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3) (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3))) |
(expm1.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(exp.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) 1) |
(*.f64 Om (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) |
(*.f64 1 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) Om) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(*.f64 (/.f64 1 U) (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(*.f64 (/.f64 1 (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 Om (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(*.f64 (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (cbrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 (cbrt.f64 Om) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) |
(*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 3) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) |
(pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) -1) |
(neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3))) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 n (*.f64 l (sqrt.f64 -2))))) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 n l)))) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 n (*.f64 l (sqrt.f64 -2))))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 n l)))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 n (*.f64 l (sqrt.f64 -2))))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 n l)))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 Om (/.f64 (*.f64 (sqrt.f64 -1) (neg.f64 n)) (*.f64 l (sqrt.f64 -2)))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) -1/2)))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))) (fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 n (*.f64 l (sqrt.f64 -2))))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 -1/2 (*.f64 (*.f64 (/.f64 Om n) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (*.f64 (/.f64 Om n) (/.f64 Om n)) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))) (fma.f64 (/.f64 (sqrt.f64 -1) (/.f64 Om (*.f64 (sqrt.f64 -2) (*.f64 n l)))) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 l (/.f64 (sqrt.f64 -1) (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (/.f64 Om (/.f64 (*.f64 (sqrt.f64 -1) (neg.f64 n)) (*.f64 l (sqrt.f64 -2)))) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) -1/2))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) |
(/.f64 n (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 -2) U)))) |
(/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n U)) Om) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 n (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 -2) U))))) |
(fma.f64 1/2 (*.f64 (*.f64 l (sqrt.f64 -2)) (-.f64 2 (/.f64 n (/.f64 Om U*)))) (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n U)) Om)) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U))))) |
(+.f64 (fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 n (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 -2) U))))) (*.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))) U)))) |
(fma.f64 1/2 (*.f64 (*.f64 l (sqrt.f64 -2)) (-.f64 2 (/.f64 n (/.f64 Om U*)))) (fma.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)) U)) (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n U)) Om))) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3) (sqrt.f64 -2)))) (*.f64 (pow.f64 n 2) (pow.f64 U 2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U)))))) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (/.f64 (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3))) (*.f64 U U))) (+.f64 (/.f64 n (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 -2) U)))) (*.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))) U)))))) |
(fma.f64 1/2 (*.f64 (*.f64 l (sqrt.f64 -2)) (-.f64 2 (/.f64 n (/.f64 Om U*)))) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 U U)) (/.f64 (*.f64 (sqrt.f64 -2) (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3))) (*.f64 n n))) (fma.f64 -1/8 (*.f64 (/.f64 Om n) (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)) U)) (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n U)) Om)))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l U) (*.f64 (sqrt.f64 -1) n)))) Om) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*))))) (sqrt.f64 -1)) (neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(fma.f64 1/2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (sqrt.f64 2))) (sqrt.f64 -1)) (/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 l U) (*.f64 (sqrt.f64 -1) n)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*))))) (sqrt.f64 -1)) (fma.f64 1/8 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 U (pow.f64 (sqrt.f64 -1) 3))) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))))) (neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(-.f64 (fma.f64 1/2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (sqrt.f64 2))) (sqrt.f64 -1)) (*.f64 (/.f64 1/8 (*.f64 (sqrt.f64 -1) (neg.f64 n))) (/.f64 (*.f64 (*.f64 l (*.f64 Om (sqrt.f64 2))) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)) U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 l U) (*.f64 (sqrt.f64 -1) n))))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 U 2))))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(fma.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*))))) (sqrt.f64 -1)) (fma.f64 1/8 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 U (pow.f64 (sqrt.f64 -1) 3))) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))))) (fma.f64 1/16 (*.f64 (/.f64 (sqrt.f64 2) (*.f64 n n)) (/.f64 (*.f64 (*.f64 Om Om) (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3))) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 U U)))) (neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(fma.f64 1/2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (sqrt.f64 2))) (sqrt.f64 -1)) (-.f64 (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) Om)) (*.f64 (sqrt.f64 -1) (neg.f64 U)))) (*.f64 1/16 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (*.f64 n n)) (/.f64 (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) (*.f64 U (*.f64 U (pow.f64 (sqrt.f64 -1) 5))))))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 l U) (*.f64 (sqrt.f64 -1) n)))))) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))) |
(fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))))) (fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5)))))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))))) (fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (fma.f64 1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (*.f64 n n)) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5))) (*.f64 (*.f64 (/.f64 (sqrt.f64 -2) n) (/.f64 l n)) 1/2))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))) |
(-.f64 (*.f64 l (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))))) |
(-.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 l (sqrt.f64 2)) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) 1/2))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (*.f64 Om Om))) (*.f64 n n))) (fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) n) (/.f64 l n))) (-.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 l (sqrt.f64 2)) (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (*.f64 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om))) 1/2))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)))))))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U))))))))) |
(*.f64 l (*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (/.f64 n (/.f64 Om U))))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (pow.f64 Om 3)) (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))))))) |
(fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (/.f64 n (/.f64 Om U))))))) (*.f64 (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (pow.f64 Om 3)))) (*.f64 (*.f64 l (*.f64 (sqrt.f64 -2) U*)) -1/2))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (pow.f64 Om 3)) (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))))) (*.f64 l (sqrt.f64 -2)) (*.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3)) (/.f64 U (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*))))))) |
(fma.f64 -1/2 (*.f64 l (*.f64 (*.f64 (sqrt.f64 -2) U*) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (pow.f64 Om 3)))))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (/.f64 n (/.f64 Om U))))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3)) (/.f64 U (pow.f64 Om 5)))) (*.f64 (*.f64 (sqrt.f64 -2) (*.f64 (*.f64 U* U*) l)) -1/8)))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 5) (pow.f64 Om 7)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 3))))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2)))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (pow.f64 Om 3)) (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 -1/16 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 5)) (/.f64 U (pow.f64 Om 7)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 3)))) (fma.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))))))) (*.f64 l (sqrt.f64 -2)) (*.f64 -1/8 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3)) (/.f64 U (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*)))))))) |
(fma.f64 -1/2 (*.f64 l (*.f64 (*.f64 (sqrt.f64 -2) U*) (sqrt.f64 (/.f64 (*.f64 U (pow.f64 n 3)) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (pow.f64 Om 3)))))) (fma.f64 -1/16 (*.f64 l (*.f64 (*.f64 (sqrt.f64 -2) (pow.f64 U* 3)) (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 5)) (/.f64 U (pow.f64 Om 7)))))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (/.f64 n (/.f64 Om U))))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3)) (/.f64 U (pow.f64 Om 5)))) (*.f64 (*.f64 (sqrt.f64 -2) (*.f64 (*.f64 U* U*) l)) -1/8))))) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (pow.f64 l 2)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) |
(*.f64 (*.f64 U (*.f64 l (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om U*)))) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om) |
(/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l)))) |
(/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om) |
(/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l)))) |
(/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(+.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U))) (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) Om)) |
(fma.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U U) (*.f64 l l))))) |
(fma.f64 n (*.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 l (*.f64 l U))) (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2)) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) |
(*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l))) |
(*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (*.f64 l l) (*.f64 n n))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))) (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(fma.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)) (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2))) |
(fma.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2)))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om)) |
(neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 (*.f64 l l) (*.f64 n n)))) Om) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om)) |
(neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (neg.f64 (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 (*.f64 l l) (*.f64 n n)))) Om) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2)) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(*.f64 U (*.f64 (*.f64 n (*.f64 l l)) 2)) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) Om))) |
(fma.f64 2 (*.f64 U (*.f64 n (*.f64 l l))) (neg.f64 (/.f64 (*.f64 n n) (/.f64 Om (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) 2))) (/.f64 (*.f64 n n) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U (-.f64 U* U))))))) |
(*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) |
(*.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l)))) |
(*.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om)) |
(/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om)) |
(/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) Om))) |
(fma.f64 n (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l))) (neg.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))) Om))) |
(fma.f64 n (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))) (/.f64 (neg.f64 (*.f64 n n)) (/.f64 Om (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 (*.f64 l l) (*.f64 n n)))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(-.f64 (fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 U* U) 3)) (pow.f64 n 4)))) (*.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l)))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (fma.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 4))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 U* U) 3)) (pow.f64 n 4)))) (-.f64 (fma.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l)))) (*.f64 -8 (/.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 4) (*.f64 l l)))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U)))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) U) (pow.f64 (-.f64 U* U) 2)))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (fma.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 l l) (*.f64 U Om)) (pow.f64 (-.f64 U* U) 2))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (fma.f64 1/16 (/.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 n n)) (*.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) U) (pow.f64 (-.f64 U* U) 2))))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 Om Om)) (/.f64 (*.f64 n n) (*.f64 l (*.f64 l U)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 l l) (*.f64 U Om)) (pow.f64 (-.f64 U* U) 2))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) U) (pow.f64 (-.f64 U* U) 2)))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (fma.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 l l) (*.f64 U Om)) (pow.f64 (-.f64 U* U) 2))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (fma.f64 1/16 (/.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 n n)) (*.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) U) (pow.f64 (-.f64 U* U) 2))))))) |
(fma.f64 1/4 (/.f64 (/.f64 (-.f64 U* U) (*.f64 l l)) U) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (fma.f64 1/16 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 Om Om)) (/.f64 (*.f64 n n) (*.f64 l (*.f64 l U)))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 (*.f64 l l) (*.f64 U Om)) (pow.f64 (-.f64 U* U) 2))))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) |
(/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))))) |
(/.f64 Om (*.f64 (*.f64 U (*.f64 l (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om U*))))) |
(-.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))))) (/.f64 1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l)))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 U (*.f64 l (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 -1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l)))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))))) (-.f64 (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) U)) (/.f64 1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 U (*.f64 l (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (fma.f64 (/.f64 n Om) (/.f64 U (*.f64 l (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)))) (/.f64 -1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U 2)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 4))))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*))))))) (-.f64 (fma.f64 -1 (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (/.f64 (*.f64 U U) (*.f64 (*.f64 l l) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 4)))) (/.f64 n (/.f64 (*.f64 (*.f64 Om (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) U))) (/.f64 1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(+.f64 (-.f64 (/.f64 Om (*.f64 (*.f64 U (*.f64 l (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (*.f64 (/.f64 U (*.f64 l l)) (/.f64 U (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 4))))) (fma.f64 (/.f64 n Om) (/.f64 U (*.f64 l (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)))) (/.f64 -1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) |
(/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l))))) |
(-.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4)))))) |
(-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l (*.f64 l (pow.f64 U 4)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5)))) (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))))))) |
(-.f64 (-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l (*.f64 l (pow.f64 U 4)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 l (*.f64 l (pow.f64 U 5)))))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) |
(/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l))))) |
(-.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4)))))) |
(-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l (*.f64 l (pow.f64 U 4)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5)))) (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U U) (*.f64 l l)))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))))))) |
(-.f64 (-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l (*.f64 l (pow.f64 U 4)))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 l (*.f64 l (pow.f64 U 5)))))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 -1/4 (/.f64 Om (/.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om)))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))))) |
(fma.f64 -1/4 (*.f64 (/.f64 Om U) (/.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) (*.f64 l l))) (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 -1/4 (/.f64 Om (/.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om)))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 1/8 (*.f64 (/.f64 n (*.f64 l l)) (/.f64 (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U))))) |
(fma.f64 -1/4 (*.f64 (/.f64 Om U) (/.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (*.f64 1/8 n) (*.f64 (/.f64 U Om) (/.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 -1/16 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 -1/4 (/.f64 Om (/.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om)))) (fma.f64 -1/16 (/.f64 (*.f64 (*.f64 (*.f64 n n) Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 1/8 (*.f64 (/.f64 n (*.f64 l l)) (/.f64 (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)))))) |
(fma.f64 -1/4 (*.f64 (/.f64 Om U) (/.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) (*.f64 l l))) (fma.f64 -1/16 (*.f64 (/.f64 (*.f64 (*.f64 n n) Om) U) (/.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3) (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (*.f64 1/8 n) (*.f64 (/.f64 U Om) (/.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))))))) |
(/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l))) |
(/.f64 Om (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (*.f64 l l) (*.f64 n n)))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))))) |
(fma.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)))) |
(fma.f64 -2 (/.f64 Om (*.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) U) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (/.f64 Om (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (*.f64 l l) (*.f64 n n))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))))) |
(fma.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))))) (fma.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l))))) |
(fma.f64 -2 (/.f64 Om (*.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) U) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (fma.f64 4 (/.f64 Om (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)) (pow.f64 n 4)))) (/.f64 Om (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (*.f64 l l) (*.f64 n n)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))) (*.f64 -8 (/.f64 Om (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4) U)))))))) |
(fma.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))))) (+.f64 (fma.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 l l)))) (*.f64 -8 (/.f64 Om (*.f64 (pow.f64 n 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4)))))))) |
(fma.f64 -2 (/.f64 Om (*.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) U) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (fma.f64 4 (/.f64 Om (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)) (pow.f64 n 4)))) (fma.f64 -8 (/.f64 (/.f64 Om (pow.f64 n 5)) (*.f64 (*.f64 l (*.f64 l U)) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4))) (/.f64 Om (*.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (*.f64 l l) (*.f64 n n))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))) |
(/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 (*.f64 l l) (*.f64 n n)))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))) |
(-.f64 (*.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l))))))) |
(-.f64 (fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 U* U) 3)) (pow.f64 n 4)))) (*.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l)))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 2))))) (fma.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (-.f64 U* U) 4))))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 U (-.f64 U* U)) (*.f64 l l)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 l l) (*.f64 (*.f64 U (pow.f64 (-.f64 U* U) 3)) (pow.f64 n 4)))) (-.f64 (fma.f64 -2 (/.f64 (pow.f64 (/.f64 Om n) 3) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 l l)))) (*.f64 -8 (/.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (*.f64 U (*.f64 (pow.f64 (-.f64 U* U) 4) (*.f64 l l)))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l)))) |
(/.f64 Om (*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l)))) |
(/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 (/.f64 Om n) (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l)))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)))) |
(+.f64 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))) (/.f64 U* (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2))))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 Om (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (+.f64 (/.f64 (/.f64 Om n) (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l)))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)))) (*.f64 (/.f64 n (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3)) (/.f64 (*.f64 U* U*) (*.f64 (*.f64 Om (*.f64 l l)) U)))) |
(+.f64 (fma.f64 (/.f64 n Om) (*.f64 (/.f64 U* (*.f64 l (*.f64 l U))) (/.f64 U* (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3))) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))))) (/.f64 U* (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2))))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 Om (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U* 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 4) (*.f64 (pow.f64 l 2) U))))))) |
(+.f64 (/.f64 n (/.f64 (*.f64 Om (*.f64 (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3) (*.f64 U (*.f64 l l)))) (*.f64 U* U*))) (+.f64 (/.f64 (/.f64 Om n) (*.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (*.f64 U (*.f64 l l)))) (+.f64 (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (/.f64 (pow.f64 U* 3) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 4))))))) |
(+.f64 (fma.f64 (/.f64 n Om) (*.f64 (/.f64 U* (*.f64 l (*.f64 l U))) (/.f64 U* (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3))) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U))))) (fma.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (/.f64 (pow.f64 U* 3) (*.f64 U (*.f64 (*.f64 l l) (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 4)))) (/.f64 U* (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2)))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 n (*.f64 n (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(*.f64 -1 (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*))))))) |
(-.f64 (/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 n (*.f64 n (*.f64 l (*.f64 l (*.f64 U* U)))))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 -1 (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 3))))) (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*)))))))) |
(-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 U (*.f64 (*.f64 l l) (pow.f64 U* 3)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U)))))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U* U)))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (fma.f64 -1 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 3))))) (fma.f64 -1 (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*))))) (neg.f64 (*.f64 (/.f64 (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 U (*.f64 (*.f64 l l) (pow.f64 U* 3)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U)))))))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3) (*.f64 l (*.f64 l (*.f64 U (pow.f64 U* 4))))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U* U)))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U))))) |
(/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 n (*.f64 n (*.f64 l (*.f64 l (*.f64 U* U)))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(*.f64 -1 (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*))))))) |
(-.f64 (/.f64 (*.f64 (neg.f64 Om) Om) (*.f64 n (*.f64 n (*.f64 l (*.f64 l (*.f64 U* U)))))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 -1 (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 3))))) (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*)))))))) |
(-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 U (*.f64 (*.f64 l l) (pow.f64 U* 3)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U)))))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U* U)))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (fma.f64 -1 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 2)) (*.f64 (pow.f64 n 4) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 3))))) (fma.f64 -1 (*.f64 (/.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) (pow.f64 n 3)) (/.f64 (pow.f64 Om 3) (*.f64 (*.f64 l l) (*.f64 U (*.f64 U* U*))))) (neg.f64 (*.f64 (/.f64 (pow.f64 (-.f64 2 (neg.f64 (/.f64 n (/.f64 Om U)))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 U (*.f64 (*.f64 l l) (pow.f64 U* 3)))) (*.f64 (pow.f64 (/.f64 Om n) 3) (/.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l (*.f64 U* (*.f64 U* U)))))))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) 3) (*.f64 l (*.f64 l (*.f64 U (pow.f64 U* 4))))))) (*.f64 (/.f64 Om (*.f64 n (*.f64 l (*.f64 n l)))) (/.f64 Om (*.f64 U* U)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) 1) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 1 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))))) (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) |
(*.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))))) (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) |
(*.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4)) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (sqrt.f64 -2) (pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) 1/2)) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 -2 Om)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) (*.f64 l (sqrt.f64 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (*.f64 l (sqrt.f64 (*.f64 n U))) (sqrt.f64 (/.f64 -2 Om)))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) (sqrt.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))))) (sqrt.f64 (cbrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))))) |
(*.f64 (pow.f64 (/.f64 -2 Om) 1/2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 -2 Om)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) (*.f64 l (sqrt.f64 (*.f64 n U)))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (*.f64 l (sqrt.f64 (*.f64 n U))) (sqrt.f64 (/.f64 -2 Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) -1/2))) |
(/.f64 1 (sqrt.f64 (*.f64 -1/2 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(/.f64 1 (sqrt.f64 (*.f64 -1/2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(*.f64 1 (/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/2) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(pow.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 3) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 1/4) 2) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(fabs.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(cbrt.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))) 1/2)) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)))))) 1)) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l)))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) 1) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(pow.f64 (*.f64 n (*.f64 l l)) 1) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l l))) 3) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3) 1/3) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(pow.f64 (*.f64 l (sqrt.f64 n)) 2) |
(sqrt.f64 (*.f64 (pow.f64 l 4) (*.f64 n n))) |
(sqrt.f64 (*.f64 (*.f64 n n) (pow.f64 l 4))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 l) l) n)) |
(*.f64 n (*.f64 l (log.f64 (exp.f64 l)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l l))))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l l)) 3)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 l l) 3))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 l l) 3) (pow.f64 n 3))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l l)))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l l)))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l l))) 1)) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l l)))) |
(*.f64 n (*.f64 l l)) |
(*.f64 l (*.f64 n l)) |
(+.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) 2) (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(+.f64 (*.f64 2 (*.f64 U (*.f64 n (*.f64 l l)))) (*.f64 (*.f64 (/.f64 n Om) (neg.f64 (-.f64 U* U))) (*.f64 U (*.f64 n (*.f64 l l))))) |
(*.f64 (*.f64 n (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (*.f64 U (*.f64 l l))) |
(*.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))) (*.f64 U (*.f64 l (*.f64 n l)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (/.f64 (fma.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) 4) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(/.f64 (*.f64 U (*.f64 n (*.f64 l l))) (/.f64 (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(/.f64 (*.f64 U (*.f64 l (*.f64 n l))) (/.f64 (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(/.f64 (*.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (/.f64 (fma.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) 4) (*.f64 U (*.f64 l (*.f64 n l))))) |
(/.f64 (*.f64 (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)) (*.f64 U (*.f64 n (*.f64 l l)))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(/.f64 (*.f64 U (*.f64 n (*.f64 l l))) (/.f64 (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(/.f64 (*.f64 U (*.f64 l (*.f64 n l))) (/.f64 (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 1) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3) 1/3) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(pow.f64 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)) 2) |
(pow.f64 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 l (sqrt.f64 (*.f64 n U)))) 2) |
(pow.f64 (*.f64 l (*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 2) |
(sqrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 2)) |
(fabs.f64 (*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(log.f64 (pow.f64 (exp.f64 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(cbrt.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3)) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3) (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 l l))) 3))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(expm1.f64 (log1p.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(exp.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1)) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(log1p.f64 (expm1.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) 1) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 Om (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 1 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2)) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (*.f64 n (neg.f64 (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 (neg.f64 Om) (*.f64 (*.f64 (neg.f64 n) U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (/.f64 (/.f64 1 U) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) Om) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 1 U) (/.f64 Om (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 1 (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 Om (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 1 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) |
(*.f64 (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 l (sqrt.f64 (*.f64 n U))))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 l (sqrt.f64 (*.f64 n U)))))) |
(/.f64 (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) (*.f64 l (*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U (*.f64 n (*.f64 l l)))) (/.f64 (cbrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2))) |
(/.f64 (*.f64 (pow.f64 (cbrt.f64 Om) 2) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (pow.f64 (cbrt.f64 (*.f64 (*.f64 n U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 2)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) (/.f64 (cbrt.f64 Om) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l)))) |
(*.f64 (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 l (sqrt.f64 (*.f64 n U))))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 l (sqrt.f64 (*.f64 n U)))))) |
(/.f64 (/.f64 Om (*.f64 l (*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) (*.f64 l (*.f64 (sqrt.f64 (*.f64 n U)) (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 n (*.f64 l l))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3))) (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (+.f64 4 (*.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) (/.f64 (/.f64 Om (*.f64 n U)) (*.f64 (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)) (*.f64 l l)))) |
(*.f64 (fma.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) 4) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 8 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 3)))) |
(*.f64 (/.f64 (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l)) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2))) (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(*.f64 (+.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 (*.f64 l l) (*.f64 n U))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(*.f64 (fma.f64 (/.f64 (-.f64 U* U) Om) n 2) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 4 (pow.f64 (/.f64 (-.f64 U* U) (/.f64 Om n)) 2)))) |
(pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 1) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 3) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3) 1/3) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 2) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(pow.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 (/.f64 Om (*.f64 U n)) (*.f64 l l))) -1) |
(/.f64 1 (*.f64 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 n U))) (*.f64 l l))) |
(/.f64 1 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))))) |
(neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (*.f64 n (neg.f64 (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 (neg.f64 Om) (*.f64 (*.f64 (neg.f64 n) U) (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 2)) |
(fabs.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) 3)) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) 3))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) 1)) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(/.f64 Om (*.f64 U (*.f64 n (*.f64 (*.f64 l l) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 99.3% | (/.f64 (sqrt.f64 2) Om) |
| ✓ | 94.5% | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| ✓ | 93.7% | (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) |
| ✓ | 80.9% | (sqrt.f64 (*.f64 U U*)) |
Compiled 55 to 25 computations (54.5% saved)
33 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 1.0ms | U | @ | -inf | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 1.0ms | U* | @ | -inf | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 1.0ms | Om | @ | 0 | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 1.0ms | U* | @ | 0 | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 1.0ms | U | @ | 0 | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 1× | batch-egg-rewrite |
| 1782× | log-prod |
| 710× | pow-exp |
| 586× | expm1-udef |
| 584× | log1p-udef |
| 508× | log-pow |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 17 | 88 |
| 1 | 351 | 84 |
| 2 | 4486 | 84 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (sqrt.f64 2) Om) |
| Outputs |
|---|
(((+.f64 0 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 0 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 U U*)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 U U*)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 1 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 (*.f64 U U*)) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 (*.f64 U U*)) (neg.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) (cbrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 U*) (sqrt.f64 U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (pow.f64 (*.f64 U U*) 1/4) (pow.f64 (*.f64 U U*) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (pow.f64 (*.f64 U U*) 1/4) (neg.f64 (pow.f64 (*.f64 U U*) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 U) (sqrt.f64 U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 U) (neg.f64 (sqrt.f64 U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 -1 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 U U*)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (neg.f64 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (neg.f64 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (*.f64 -1 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (*.f64 -1 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (*.f64 -1 (sqrt.f64 U)) (sqrt.f64 U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (-.f64 0 (pow.f64 (*.f64 U U*) 3/2)) (+.f64 0 (fma.f64 U U* (*.f64 0 (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (-.f64 0 (*.f64 U U*)) (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (*.f64 U U*) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (sqrt.f64 (*.f64 U U*)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 U U*) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 U U*) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((neg.f64 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((fabs.f64 (sqrt.f64 (*.f64 U U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (pow.f64 (*.f64 U U*) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 U U*))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 U U*))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f))) |
(((+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 n l) (/.f64 Om (sqrt.f64 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 n l))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 n l)) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) 1) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 Om)) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((sqrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 n l) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f))) |
(((+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (sqrt.f64 2) (*.f64 n l))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((neg.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((sqrt.f64 (*.f64 (*.f64 U U*) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) (pow.f64 (*.f64 U U*) 3/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f))) |
(((+.f64 0 (/.f64 (sqrt.f64 2) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 2) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (sqrt.f64 2) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 1 (/.f64 (sqrt.f64 2) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) (cbrt.f64 (/.f64 2 (*.f64 Om Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 2 (*.f64 Om Om))) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (cbrt.f64 2) (*.f64 (cbrt.f64 (sqrt.f64 2)) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (neg.f64 (sqrt.f64 2)) (/.f64 1 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 1 Om) (sqrt.f64 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 2) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (sqrt.f64 2) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 2) 1) (/.f64 (cbrt.f64 (sqrt.f64 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (cbrt.f64 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (sqrt.f64 2)) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (pow.f64 2 1/4) 1) (/.f64 (pow.f64 2 1/4) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((*.f64 (/.f64 (pow.f64 2 1/4) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (pow.f64 2 1/4) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (/.f64 (sqrt.f64 2) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (/.f64 Om (sqrt.f64 2)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((pow.f64 (/.f64 (/.f64 Om (sqrt.f64 2)) 1) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((neg.f64 (/.f64 (sqrt.f64 2) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((sqrt.f64 (/.f64 2 (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((cbrt.f64 (/.f64 (*.f64 2 (sqrt.f64 2)) (pow.f64 Om 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (log.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 2) Om))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 Om (sqrt.f64 2))) -1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f)) ((log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 2) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (/.f64 (sqrt.f64 2) Om)) #f))) |
| 1× | egg-herbie |
| 852× | log-prod |
| 554× | cube-prod |
| 506× | distribute-rgt-neg-in |
| 490× | distribute-lft-neg-in |
| 452× | associate-*r* |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 362 | 6207 |
| 1 | 793 | 6051 |
| 2 | 3277 | 6043 |
| 1× | node limit |
| Inputs |
|---|
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(+.f64 0 (sqrt.f64 (*.f64 U U*))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(-.f64 0 (sqrt.f64 (*.f64 U U*))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) 1) |
(*.f64 (sqrt.f64 (*.f64 U U*)) 1) |
(*.f64 (sqrt.f64 (*.f64 U U*)) -1) |
(*.f64 1 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (neg.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) (cbrt.f64 (*.f64 U U*))) |
(*.f64 (sqrt.f64 U*) (sqrt.f64 U)) |
(*.f64 (pow.f64 (*.f64 U U*) 1/4) (pow.f64 (*.f64 U U*) 1/4)) |
(*.f64 (pow.f64 (*.f64 U U*) 1/4) (neg.f64 (pow.f64 (*.f64 U U*) 1/4))) |
(*.f64 (sqrt.f64 U) (sqrt.f64 U*)) |
(*.f64 (sqrt.f64 U) (neg.f64 (sqrt.f64 U*))) |
(*.f64 -1 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 U U*)) 1/2)) |
(*.f64 (neg.f64 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (neg.f64 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) |
(*.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 U*)) |
(*.f64 (*.f64 -1 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 -1 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) |
(*.f64 (*.f64 -1 (sqrt.f64 U)) (sqrt.f64 U*)) |
(/.f64 (-.f64 0 (pow.f64 (*.f64 U U*) 3/2)) (+.f64 0 (fma.f64 U U* (*.f64 0 (sqrt.f64 (*.f64 U U*)))))) |
(/.f64 (-.f64 0 (*.f64 U U*)) (sqrt.f64 (*.f64 U U*))) |
(pow.f64 (*.f64 U U*) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 U U*)) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) 3) |
(pow.f64 (pow.f64 (*.f64 U U*) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 U U*) 1/4) 2) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(fabs.f64 (sqrt.f64 (*.f64 U U*))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*))))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*)))))) |
(cbrt.f64 (pow.f64 (*.f64 U U*) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 U U*)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1) 1/2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) 3)) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 U U*))) 1/3)) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 U U*))) 2)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U U*)))) |
(+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) |
(/.f64 (*.f64 n l) (/.f64 Om (sqrt.f64 2))) |
(/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 n l))) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 n l)) (neg.f64 Om)) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) 1) Om) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 1) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 3) |
(pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 2) |
(pow.f64 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l))) -1) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))))) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 n l) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 2)) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) |
(-.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (sqrt.f64 2) (*.f64 n l))) Om) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) Om) |
(pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 1) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 3) |
(pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 2) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 U U*) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))))) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) (pow.f64 (*.f64 U U*) 3/2))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 2)) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 0 (/.f64 (sqrt.f64 2) Om)) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) 1) |
(*.f64 (sqrt.f64 2) (/.f64 1 Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) 1) |
(*.f64 1 (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) (cbrt.f64 (/.f64 2 (*.f64 Om Om)))) |
(*.f64 (cbrt.f64 (/.f64 2 (*.f64 Om Om))) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (cbrt.f64 2) (*.f64 (cbrt.f64 (sqrt.f64 2)) (/.f64 1 Om))) |
(*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (neg.f64 (sqrt.f64 2)) (/.f64 1 (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (sqrt.f64 2)) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 2) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (sqrt.f64 2) (sqrt.f64 Om))) |
(*.f64 (/.f64 (cbrt.f64 2) 1) (/.f64 (cbrt.f64 (sqrt.f64 2)) Om)) |
(*.f64 (/.f64 (cbrt.f64 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (/.f64 (cbrt.f64 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (sqrt.f64 2)) (sqrt.f64 Om))) |
(*.f64 (/.f64 (pow.f64 2 1/4) 1) (/.f64 (pow.f64 2 1/4) Om)) |
(*.f64 (/.f64 (pow.f64 2 1/4) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (pow.f64 2 1/4) (cbrt.f64 Om))) |
(pow.f64 (/.f64 (sqrt.f64 2) Om) 1) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) 3) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) 2) |
(pow.f64 (/.f64 Om (sqrt.f64 2)) -1) |
(pow.f64 (/.f64 (/.f64 Om (sqrt.f64 2)) 1) -1) |
(neg.f64 (/.f64 (sqrt.f64 2) (neg.f64 Om))) |
(sqrt.f64 (/.f64 2 (*.f64 Om Om))) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 2) Om)))) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3)) |
(cbrt.f64 (/.f64 (*.f64 2 (sqrt.f64 2)) (pow.f64 Om 3))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 2) Om))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) 2)) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (sqrt.f64 2))) -1)) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 2) Om))) |
| Outputs |
|---|
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(+.f64 0 (sqrt.f64 (*.f64 U U*))) |
(sqrt.f64 (*.f64 U U*)) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 2 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))))) |
(-.f64 0 (sqrt.f64 (*.f64 U U*))) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) 1) |
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) 1) |
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) -1) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(*.f64 1 (sqrt.f64 (*.f64 U U*))) |
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (neg.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) (cbrt.f64 (*.f64 U U*))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 U*) (sqrt.f64 U)) |
(*.f64 (pow.f64 (*.f64 U U*) 1/4) (pow.f64 (*.f64 U U*) 1/4)) |
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (pow.f64 (*.f64 U U*) 1/4) (neg.f64 (pow.f64 (*.f64 U U*) 1/4))) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (sqrt.f64 U) (sqrt.f64 U*)) |
(*.f64 (sqrt.f64 U*) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 U) (neg.f64 (sqrt.f64 U*))) |
(*.f64 (sqrt.f64 U*) (neg.f64 (sqrt.f64 U))) |
(*.f64 -1 (sqrt.f64 (*.f64 U U*))) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 U U*))) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 U U*))) |
(sqrt.f64 (*.f64 U U*)) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 U U*)) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 U U*)) 2)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 U U*))) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (sqrt.f64 (cbrt.f64 (*.f64 U U*)))) |
(*.f64 (neg.f64 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (neg.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (neg.f64 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 U*)) |
(*.f64 (sqrt.f64 U*) (neg.f64 (sqrt.f64 U))) |
(*.f64 (*.f64 -1 (cbrt.f64 (*.f64 U U*))) (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (cbrt.f64 (*.f64 U U*)) (neg.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 -1 (pow.f64 (*.f64 U U*) 1/4)) (pow.f64 (*.f64 U U*) 1/4)) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(*.f64 (*.f64 -1 (sqrt.f64 U)) (sqrt.f64 U*)) |
(*.f64 (sqrt.f64 U*) (neg.f64 (sqrt.f64 U))) |
(/.f64 (-.f64 0 (pow.f64 (*.f64 U U*) 3/2)) (+.f64 0 (fma.f64 U U* (*.f64 0 (sqrt.f64 (*.f64 U U*)))))) |
(/.f64 (neg.f64 (pow.f64 (*.f64 U U*) 3/2)) (fma.f64 U U* 0)) |
(/.f64 (neg.f64 (pow.f64 (*.f64 U U*) 3/2)) (*.f64 U U*)) |
(/.f64 (-.f64 0 (*.f64 U U*)) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (neg.f64 (*.f64 U U*)) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 U (neg.f64 U*)) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 U (sqrt.f64 (*.f64 U U*))) (neg.f64 U*)) |
(pow.f64 (*.f64 U U*) 1/2) |
(sqrt.f64 (*.f64 U U*)) |
(pow.f64 (sqrt.f64 (*.f64 U U*)) 1) |
(sqrt.f64 (*.f64 U U*)) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*))) 3) |
(sqrt.f64 (*.f64 U U*)) |
(pow.f64 (pow.f64 (*.f64 U U*) 3/2) 1/3) |
(sqrt.f64 (*.f64 U U*)) |
(pow.f64 (pow.f64 (*.f64 U U*) 1/4) 2) |
(sqrt.f64 (*.f64 U U*)) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(fabs.f64 (sqrt.f64 (*.f64 U U*))) |
(sqrt.f64 (*.f64 U U*)) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 U U*)) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*))))) |
(sqrt.f64 (*.f64 U U*)) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 U U*)))))) |
(neg.f64 (sqrt.f64 (*.f64 U U*))) |
(cbrt.f64 (pow.f64 (*.f64 U U*) 3/2)) |
(sqrt.f64 (*.f64 U U*)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1) 1/2)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 U U*)) 1/2) 1)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 U U*))) 1) 1)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (sqrt.f64 (*.f64 U U*)))) 3)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 U U*))) 1/3)) |
(sqrt.f64 (*.f64 U U*)) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 U U*))) 2)) |
(sqrt.f64 (*.f64 U U*)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 U U*)) |
(+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 n l) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 1 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 n l))) (neg.f64 Om)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 n l)) (neg.f64 Om)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) 1) Om) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(/.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 1) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 3) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) 1/3) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 2) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(pow.f64 (/.f64 Om (*.f64 (sqrt.f64 2) (*.f64 n l))) -1) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 n l) 3))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l))) 1) 1)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 3)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 1/3)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) 2)) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)))) |
(*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) |
(*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) |
(*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) |
(+.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*))))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(-.f64 0 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (sqrt.f64 2) (*.f64 n l))) Om) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) (neg.f64 Om)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U U*))) Om) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 1) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 3) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(pow.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3) 1/3) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 2) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(sqrt.f64 (*.f64 (*.f64 U U*) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 2))) |
(sqrt.f64 (*.f64 (*.f64 U U*) (pow.f64 (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om)) 2))) |
(sqrt.f64 (*.f64 U (*.f64 U* (pow.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) 2)))) |
(sqrt.f64 (*.f64 U (*.f64 U* (pow.f64 (*.f64 (sqrt.f64 2) (/.f64 l (/.f64 Om n))) 2)))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 n) l) (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (*.f64 n (*.f64 l (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (neg.f64 n))) Om)) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) 3)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3) (pow.f64 (*.f64 U U*) 3/2))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) 3))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*))))) 1) 1)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 3)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 1/3)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) 2)) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (*.f64 n l) (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (*.f64 n l) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) |
(+.f64 0 (/.f64 (sqrt.f64 2) Om)) |
(/.f64 (sqrt.f64 2) Om) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(*.f64 2 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) 1) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (sqrt.f64 2) (/.f64 1 Om)) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (/.f64 (sqrt.f64 2) Om) 1) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 1 (/.f64 (sqrt.f64 2) Om)) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) (cbrt.f64 (/.f64 2 (*.f64 Om Om)))) |
(*.f64 (cbrt.f64 (/.f64 2 (*.f64 Om Om))) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) (cbrt.f64 (/.f64 2 (*.f64 Om Om)))) |
(*.f64 (cbrt.f64 2) (*.f64 (cbrt.f64 (sqrt.f64 2)) (/.f64 1 Om))) |
(*.f64 (cbrt.f64 2) (*.f64 (/.f64 1 Om) (cbrt.f64 (sqrt.f64 2)))) |
(/.f64 (cbrt.f64 2) (/.f64 Om (cbrt.f64 (sqrt.f64 2)))) |
(*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (neg.f64 (sqrt.f64 2)) (/.f64 1 (neg.f64 Om))) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (/.f64 1 Om) (sqrt.f64 2)) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 2) (cbrt.f64 Om))) |
(/.f64 (/.f64 (sqrt.f64 2) (cbrt.f64 Om)) (pow.f64 (cbrt.f64 Om) 2)) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (sqrt.f64 2) (sqrt.f64 Om))) |
(/.f64 (/.f64 (sqrt.f64 2) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(*.f64 (/.f64 (cbrt.f64 2) 1) (/.f64 (cbrt.f64 (sqrt.f64 2)) Om)) |
(*.f64 (cbrt.f64 2) (*.f64 (/.f64 1 Om) (cbrt.f64 (sqrt.f64 2)))) |
(/.f64 (cbrt.f64 2) (/.f64 Om (cbrt.f64 (sqrt.f64 2)))) |
(*.f64 (/.f64 (cbrt.f64 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) (/.f64 (cbrt.f64 2) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (cbrt.f64 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (sqrt.f64 2)) (sqrt.f64 Om))) |
(*.f64 (/.f64 (pow.f64 2 1/4) 1) (/.f64 (pow.f64 2 1/4) Om)) |
(/.f64 (sqrt.f64 2) Om) |
(*.f64 (/.f64 (pow.f64 2 1/4) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (pow.f64 2 1/4) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 2) (cbrt.f64 Om))) |
(/.f64 (/.f64 (sqrt.f64 2) (cbrt.f64 Om)) (pow.f64 (cbrt.f64 Om) 2)) |
(pow.f64 (/.f64 (sqrt.f64 2) Om) 1) |
(/.f64 (sqrt.f64 2) Om) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om)) 3) |
(/.f64 (sqrt.f64 2) Om) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) 1/3) |
(/.f64 (sqrt.f64 2) Om) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om)) 2) |
(/.f64 (sqrt.f64 2) Om) |
(pow.f64 (/.f64 Om (sqrt.f64 2)) -1) |
(/.f64 (sqrt.f64 2) Om) |
(pow.f64 (/.f64 (/.f64 Om (sqrt.f64 2)) 1) -1) |
(/.f64 (sqrt.f64 2) Om) |
(neg.f64 (/.f64 (sqrt.f64 2) (neg.f64 Om))) |
(/.f64 (sqrt.f64 2) Om) |
(sqrt.f64 (/.f64 2 (*.f64 Om Om))) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (sqrt.f64 2) Om) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 2) Om)))) |
(/.f64 (sqrt.f64 2) Om) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3)) |
(/.f64 (sqrt.f64 2) Om) |
(cbrt.f64 (/.f64 (*.f64 2 (sqrt.f64 2)) (pow.f64 Om 3))) |
(/.f64 (sqrt.f64 2) Om) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1)) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 2) Om)) 1) 1)) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 2) Om))) 3)) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 2) Om))) 1/3)) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 2) Om))) 2)) |
(/.f64 (sqrt.f64 2) Om) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (sqrt.f64 2))) -1)) |
(/.f64 (sqrt.f64 2) Om) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 2) Om))) |
(/.f64 (sqrt.f64 2) Om) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| 90.6% | (*.f64 n (*.f64 l (-.f64 U* U))) | |
| ✓ | 89.6% | (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om) |
| 89.5% | (*.f64 n (*.f64 l U)) | |
| ✓ | 60.7% | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
Compiled 160 to 46 computations (71.3% saved)
30 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 3.0ms | n | @ | 0 | (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om) |
| 2.0ms | U | @ | inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
| 2.0ms | n | @ | inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
| 2.0ms | U | @ | -inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
| 2.0ms | U* | @ | inf | (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
| 1× | batch-egg-rewrite |
| 804× | expm1-udef |
| 802× | log1p-udef |
| 476× | add-sqr-sqrt |
| 468× | pow1 |
| 468× | *-un-lft-identity |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 21 | 134 |
| 1 | 458 | 118 |
| 2 | 6694 | 118 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) |
(/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (/.f64 1 Om) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n)))) (sqrt.f64 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))))) (neg.f64 (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n))) (/.f64 1 (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om) (*.f64 l (*.f64 U n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (cbrt.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) 3) (pow.f64 Om 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f)) ((log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om)) #f))) |
| 1× | egg-herbie |
| 1506× | fma-def |
| 1310× | distribute-lft-in |
| 808× | associate-*r* |
| 652× | associate-*l* |
| 528× | log-prod |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 359 | 13700 |
| 1 | 998 | 13294 |
| 2 | 4293 | 12654 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) |
(+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 5))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)) (pow.f64 (sqrt.f64 -2) 3)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 5))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)) (pow.f64 (sqrt.f64 -2) 3)))) (+.f64 (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 7))) (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)) (pow.f64 (sqrt.f64 -2) 5)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2))))))) |
(sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U* 2))))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (+.f64 (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5)))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U* 3))))) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U* 2))))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))))) |
(sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) |
(+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 5)))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U 3))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U)))))) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) Om)) (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U))))))) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) Om)) (+.f64 (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 5) (pow.f64 (-.f64 U* U) 5)))) (pow.f64 Om 2)))))) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (/.f64 1 Om) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) |
(/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))))) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n)))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))))) (neg.f64 (sqrt.f64 Om))) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) |
(*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) |
(*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (/.f64 1 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) |
(*.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n))) (/.f64 1 (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om) (*.f64 l (*.f64 U n))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (cbrt.f64 Om))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) |
(pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) -1) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (neg.f64 Om))) |
(sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) |
(log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) 3) (pow.f64 Om 3))) |
(expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
| Outputs |
|---|
(*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) |
(*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l))) (sqrt.f64 -2)) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l)) (sqrt.f64 -2)) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U)))) (sqrt.f64 -2)) |
(+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2))))) |
(fma.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l))) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (/.f64 n (/.f64 (sqrt.f64 -2) (-.f64 U* U)))))) |
(fma.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l)) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U))))) |
(fma.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U)))) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 (pow.f64 Om 3) l) (*.f64 l U)))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 5))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)) (pow.f64 (sqrt.f64 -2) 3)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2)))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (pow.f64 Om 5))) (/.f64 (*.f64 n n) (/.f64 (pow.f64 (sqrt.f64 -2) 3) (pow.f64 (-.f64 U* U) 2)))) (fma.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l))) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (/.f64 n (/.f64 (sqrt.f64 -2) (-.f64 U* U))))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 5) l))) (*.f64 (/.f64 (*.f64 n n) (sqrt.f64 -2)) (/.f64 (pow.f64 (-.f64 U* U) 2) -2))) (fma.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l)) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 (pow.f64 Om 3) l) (*.f64 l U)))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U))) (fma.f64 (*.f64 (/.f64 (*.f64 n n) (sqrt.f64 -2)) (/.f64 (pow.f64 (-.f64 U* U) 2) -2)) (*.f64 -1/8 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l U)) (/.f64 (pow.f64 Om 5) l)))) (*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U)))) (sqrt.f64 -2)))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 5))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)) (pow.f64 (sqrt.f64 -2) 3)))) (+.f64 (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 7))) (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)) (pow.f64 (sqrt.f64 -2) 5)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) (sqrt.f64 -2)) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (pow.f64 Om 3))) (/.f64 (*.f64 n (-.f64 U* U)) (sqrt.f64 -2))))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (pow.f64 Om 5))) (/.f64 (*.f64 n n) (/.f64 (pow.f64 (sqrt.f64 -2) 3) (pow.f64 (-.f64 U* U) 2)))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 7) l))) (/.f64 (pow.f64 n 3) (/.f64 (pow.f64 (sqrt.f64 -2) 5) (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l))) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (/.f64 n (/.f64 (sqrt.f64 -2) (-.f64 U* U)))))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 5) l))) (*.f64 (/.f64 (*.f64 n n) (sqrt.f64 -2)) (/.f64 (pow.f64 (-.f64 U* U) 2) -2))) (fma.f64 1/16 (*.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 7)) l)) (/.f64 (pow.f64 n 3) (/.f64 (pow.f64 (sqrt.f64 -2) 5) (pow.f64 (-.f64 U* U) 3)))) (fma.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l)) (sqrt.f64 -2) (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 Om 3) l))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U))))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l U)) (/.f64 (pow.f64 Om 5) l))) (*.f64 (/.f64 (*.f64 n n) (sqrt.f64 -2)) (/.f64 (pow.f64 (-.f64 U* U) 2) -2))) (fma.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U)))) (sqrt.f64 -2) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 n (/.f64 (/.f64 (pow.f64 Om 3) l) (*.f64 l U)))) (*.f64 (/.f64 n (sqrt.f64 -2)) (-.f64 U* U))) (*.f64 (/.f64 (pow.f64 n 3) (/.f64 (pow.f64 (sqrt.f64 -2) 5) (pow.f64 (-.f64 U* U) 3))) (*.f64 1/16 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) (pow.f64 Om 7)) l))))))) |
(sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2))))) |
(sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 3)) (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (*.f64 n (*.f64 l U*))) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))) (*.f64 n (*.f64 l U*))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))) |
(fma.f64 (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (/.f64 (*.f64 l U) (pow.f64 Om 3)))) (*.f64 (*.f64 n (*.f64 l U*)) 1/2) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U* 2))))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 3)) (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (*.f64 n (*.f64 l U*))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)) 3))) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))) (*.f64 n (*.f64 l U*))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 3))) (*.f64 n (*.f64 n (*.f64 (*.f64 l U*) (*.f64 l U*))))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))))))) |
(fma.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 5)) (/.f64 (*.f64 l U) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 3)))) (*.f64 (*.f64 n (*.f64 n (*.f64 (*.f64 l U*) (*.f64 l U*)))) -1/8) (fma.f64 (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (/.f64 (*.f64 l U) (pow.f64 Om 3)))) (*.f64 (*.f64 n (*.f64 l U*)) 1/2) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))))) (*.f64 n (*.f64 l U*)))) (+.f64 (*.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 5)))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U* 3))))) (+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U* 2))))) (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 3)) (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (*.f64 n (*.f64 l U*))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 7)) (pow.f64 (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)) 5))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U* 3)))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)) 3))) (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U*)))) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))) (*.f64 n (*.f64 l U*))) (fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 7)) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 5))) (*.f64 (pow.f64 l 3) (*.f64 (pow.f64 U* 3) (pow.f64 n 3)))) (fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 3))) (*.f64 n (*.f64 n (*.f64 (*.f64 l U*) (*.f64 l U*))))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))))) |
(fma.f64 1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 n (*.f64 l U)) (pow.f64 Om 7)) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 5))) (*.f64 (pow.f64 l 3) (*.f64 (pow.f64 U* 3) (pow.f64 n 3)))) (fma.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 5)) (/.f64 (*.f64 l U) (pow.f64 (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) 3)))) (*.f64 (*.f64 n (*.f64 n (*.f64 (*.f64 l U*) (*.f64 l U*)))) -1/8) (fma.f64 (sqrt.f64 (*.f64 (/.f64 n (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (/.f64 (*.f64 l U) (pow.f64 Om 3)))) (*.f64 (*.f64 n (*.f64 l U*)) 1/2) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))))))) |
(sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) |
(sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) |
(sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))) |
(+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U))))) |
(+.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (*.f64 n (*.f64 l U))))) |
(fma.f64 -1/2 (*.f64 n (*.f64 (*.f64 l U) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))) |
(fma.f64 (*.f64 n (*.f64 l U)) (*.f64 -1/2 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 3)) (/.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U)))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 3))) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U))) (+.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (*.f64 n (*.f64 l U)))))) |
(fma.f64 -1/8 (*.f64 (*.f64 n n) (*.f64 (*.f64 l (*.f64 l (*.f64 U U))) (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3))))) (fma.f64 -1/2 (*.f64 n (*.f64 (*.f64 l U) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) |
(fma.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 3)) (/.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))) (*.f64 (*.f64 n (*.f64 l U)) -1/2) (fma.f64 -1/8 (*.f64 (*.f64 n n) (*.f64 (*.f64 l (*.f64 l (*.f64 U U))) (sqrt.f64 (/.f64 (/.f64 n (/.f64 (pow.f64 Om 5) (*.f64 l U))) (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 3))))) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) |
(+.f64 (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 5) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) (+.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 7) (pow.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) 5)))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U 3))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))))) (*.f64 n (*.f64 l U))))))) |
(fma.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 3))) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U U))) (+.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (fma.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 7)) (pow.f64 (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))) 5))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 3) (pow.f64 U 3)))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))))) (*.f64 n (*.f64 l U))))))) |
(+.f64 (fma.f64 -1/2 (*.f64 n (*.f64 (*.f64 l U) (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (pow.f64 Om 3) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))))))) (*.f64 (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 7)) (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 5))) (*.f64 (*.f64 (pow.f64 U 3) (*.f64 (pow.f64 n 3) (pow.f64 l 3))) -1/16))) (fma.f64 -1/8 (*.f64 (*.f64 n n) (*.f64 (*.f64 l (*.f64 l (*.f64 U U))) (sqrt.f64 (/.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 Om 5)) (pow.f64 (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))) 3))))) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*)))))))) |
(fma.f64 -1/8 (*.f64 (*.f64 n n) (*.f64 (*.f64 l (*.f64 l (*.f64 U U))) (sqrt.f64 (/.f64 (/.f64 n (/.f64 (pow.f64 Om 5) (*.f64 l U))) (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 3))))) (fma.f64 (*.f64 n (*.f64 l U)) (*.f64 -1/2 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 3)) (/.f64 (*.f64 l U) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))))))) (fma.f64 -1/16 (*.f64 (sqrt.f64 (*.f64 (/.f64 n (pow.f64 Om 7)) (/.f64 (*.f64 l U) (pow.f64 (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) 5)))) (pow.f64 (*.f64 n (*.f64 l U)) 3)) (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))))))) |
(*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) |
(*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U)))))) |
(fma.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om) (neg.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U)))))) |
(-.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))))) Om) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U))))) |
(-.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om) (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) n) (/.f64 l (-.f64 U* U))))) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) Om)) (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U))))))) |
(fma.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om) (fma.f64 -1/2 (*.f64 Om (sqrt.f64 (/.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3))))) (neg.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U))))))) |
(+.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))))) Om) (-.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 l (pow.f64 n 3)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 (-.f64 U* U) 3)))) (*.f64 Om -1/2)) (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U)))))) |
(-.f64 (fma.f64 Om (*.f64 -1/2 (sqrt.f64 (*.f64 (/.f64 l (pow.f64 n 3)) (/.f64 (*.f64 n (*.f64 l U)) (pow.f64 (-.f64 U* U) 3))))) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) n) (/.f64 l (-.f64 U* U))))) |
(+.f64 (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U))))) (/.f64 1 Om)) (+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) Om)) (+.f64 (*.f64 -1 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 n (-.f64 U* U))))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) (*.f64 (pow.f64 n 5) (pow.f64 (-.f64 U* U) 5)))) (pow.f64 Om 2)))))) |
(fma.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om) (fma.f64 -1/2 (*.f64 Om (sqrt.f64 (/.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -1 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (/.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (pow.f64 n 5)) (pow.f64 (-.f64 U* U) 5))) (*.f64 Om Om)))))) |
(+.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))))) Om) (fma.f64 -1/2 (*.f64 Om (sqrt.f64 (*.f64 (/.f64 l (pow.f64 n 3)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -1/2 (*.f64 Om (*.f64 Om (sqrt.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (pow.f64 (-.f64 U* U) 5) (/.f64 l (pow.f64 n 5))))))) (neg.f64 (sqrt.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) n) (/.f64 l (-.f64 U* U)))))))) |
(+.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om) (fma.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 l U)) (/.f64 (pow.f64 (-.f64 U* U) 5) (/.f64 l (pow.f64 n 5))))) (*.f64 (*.f64 Om Om) -1/2) (-.f64 (*.f64 (sqrt.f64 (*.f64 (/.f64 l (pow.f64 n 3)) (/.f64 (*.f64 n (*.f64 l U)) (pow.f64 (-.f64 U* U) 3)))) (*.f64 Om -1/2)) (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) n) (/.f64 l (-.f64 U* U))))))) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) |
(/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om) |
(*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) l)) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (*.f64 l (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 l (fma.f64 (/.f64 n Om) (-.f64 U* U) -2))) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) Om)) |
(/.f64 (neg.f64 (*.f64 l (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) Om) |
(/.f64 (*.f64 (*.f64 n (*.f64 (*.f64 l U) l)) (neg.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) Om) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) Om)) |
(/.f64 (neg.f64 (*.f64 l (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) Om) |
(/.f64 (*.f64 (*.f64 n (*.f64 (*.f64 l U) l)) (neg.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) Om) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) Om)) |
(/.f64 (neg.f64 (*.f64 l (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) Om) |
(/.f64 (*.f64 (*.f64 n (*.f64 (*.f64 l U) l)) (neg.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) Om) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 l (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))))) Om)) |
(neg.f64 (/.f64 (*.f64 (*.f64 l (fabs.f64 (*.f64 n (*.f64 l U)))) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) Om)) |
(/.f64 (neg.f64 (*.f64 l (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))) Om) |
(/.f64 (*.f64 (*.f64 n (*.f64 (*.f64 l U) l)) (neg.f64 (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))) Om) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*)))) |
(*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om)) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*)))) |
(*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om)) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U*))) (pow.f64 Om 2)) (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om) (*.f64 l -2)))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U*))))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) (*.f64 (/.f64 n (/.f64 Om (*.f64 l U*))) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) Om) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2))) |
(neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) Om) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U)))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om) (*.f64 -1 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l U))) (pow.f64 Om 2)))) |
(+.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*)))))) (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U)))))) |
(-.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) (fma.f64 l -2 (/.f64 n (/.f64 Om (*.f64 l U*))))) (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om))) |
(fma.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 l -2 (*.f64 (/.f64 n Om) (*.f64 l U*))) (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (/.f64 (neg.f64 n) (/.f64 Om (*.f64 l U))))) |
(/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) |
(/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) |
(/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om) |
(*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om)) |
(*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) |
(/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om) |
(*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(+.f64 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 n (*.f64 l (-.f64 U* U)))) (pow.f64 Om 2)) (*.f64 -2 (/.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) l) Om))) |
(+.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 Om l)) -2) (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 n l) (-.f64 U* U))))) |
(fma.f64 (*.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) Om) l) -2 (*.f64 (/.f64 (*.f64 n (fabs.f64 (*.f64 n (*.f64 l U)))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om))) |
(fma.f64 (/.f64 (*.f64 n (*.f64 n (*.f64 l U))) Om) (/.f64 (*.f64 l (-.f64 U* U)) Om) (*.f64 (/.f64 n (/.f64 (/.f64 Om l) (*.f64 l U))) -2)) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) 1) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(*.f64 1 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))) (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))) (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (/.f64 1 Om) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 Om)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) (sqrt.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) 1/2) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) |
(/.f64 1 (sqrt.f64 (/.f64 Om (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))) (*.f64 n (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 n (*.f64 l U))) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) |
(/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 n (*.f64 l U))) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) |
(/.f64 1 (/.f64 (sqrt.f64 Om) (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) (sqrt.f64 (/.f64 Om (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) (sqrt.f64 (/.f64 Om (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) (sqrt.f64 (/.f64 Om (*.f64 n (*.f64 l U))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n)))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))) (neg.f64 (*.f64 n (*.f64 l U))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 U (neg.f64 n)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (neg.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))))) (sqrt.f64 (neg.f64 Om))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))))) (neg.f64 (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (/.f64 1 (sqrt.f64 Om))) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) (sqrt.f64 Om)) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/2) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 3) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) 3/2)) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) 2) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(fabs.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(log.f64 (exp.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(exp.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1/2)) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1)) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) |
(sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) 1) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l (*.f64 U n)) (/.f64 1 Om))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (*.f64 l (*.f64 U n)) (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (/.f64 1 Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 1 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (*.f64 (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) 4)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) 4)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (*.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4) (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (*.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (/.f64 1 Om))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (*.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (*.f64 (*.f64 l U) (neg.f64 n))) (/.f64 1 (neg.f64 Om))) |
(*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))) (*.f64 (neg.f64 (*.f64 n (*.f64 l U))) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (neg.f64 n) (/.f64 (neg.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))))) |
(*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 n (*.f64 l (neg.f64 U))) (neg.f64 Om))) |
(*.f64 (/.f64 1 Om) (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1/4)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l U)))) |
(*.f64 (*.f64 (/.f64 l (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n U)) (/.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (sqrt.f64 Om)) (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 Om)) |
(/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (/.f64 (sqrt.f64 Om) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U)))) |
(/.f64 (*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U))) (sqrt.f64 Om)) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) 1) (/.f64 (*.f64 l (*.f64 U n)) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (*.f64 l (*.f64 U n)) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l U)))) |
(*.f64 (*.f64 (/.f64 l (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n U)) (/.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (cbrt.f64 Om))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om)) (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 Om)) |
(/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (/.f64 (sqrt.f64 Om) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U)))) |
(/.f64 (*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U))) (sqrt.f64 Om)) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (sqrt.f64 Om)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 Om)) |
(/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (/.f64 (sqrt.f64 Om) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U)))) |
(/.f64 (*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U))) (sqrt.f64 Om)) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) 1) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) Om) (*.f64 l (*.f64 U n))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (*.f64 l (*.f64 U n)) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l U)))) |
(*.f64 (*.f64 (/.f64 l (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n U)) (/.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (cbrt.f64 Om))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) 1) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (/.f64 (pow.f64 (cbrt.f64 (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) 2) (pow.f64 (cbrt.f64 Om) 2))) |
(/.f64 (pow.f64 (cbrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) 2) (/.f64 (pow.f64 (cbrt.f64 Om) 2) (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))))) |
(/.f64 (pow.f64 (cbrt.f64 (*.f64 l (*.f64 (*.f64 n U) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) 2) (/.f64 (pow.f64 (cbrt.f64 Om) 2) (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 2) (sqrt.f64 Om)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (sqrt.f64 Om))) |
(/.f64 (*.f64 (/.f64 1 (sqrt.f64 Om)) (*.f64 (*.f64 n (*.f64 l U)) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (sqrt.f64 Om)) |
(/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (/.f64 (sqrt.f64 Om) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U)))) |
(/.f64 (*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (*.f64 (/.f64 l (sqrt.f64 Om)) (*.f64 n U))) (sqrt.f64 Om)) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) 1) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) Om)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))))) (cbrt.f64 Om))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (/.f64 (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))) (pow.f64 (cbrt.f64 Om) 2)) (/.f64 n (/.f64 (cbrt.f64 Om) (*.f64 l U)))) |
(*.f64 (*.f64 (/.f64 l (pow.f64 (cbrt.f64 Om) 2)) (*.f64 n U)) (/.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (cbrt.f64 Om))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) (cbrt.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (cbrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (*.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))))) (cbrt.f64 (sqrt.f64 (*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))))) 4)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)))) (pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))))) 4)) |
(pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 1) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(pow.f64 (sqrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 2) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(pow.f64 (cbrt.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 3) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2) 1/2) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(pow.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3) 1/3) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 l (*.f64 U n))) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U))))) -1) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(neg.f64 (/.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) (neg.f64 Om))) |
(*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U))) (*.f64 (neg.f64 (*.f64 n (*.f64 l U))) (/.f64 1 (neg.f64 Om)))) |
(/.f64 (neg.f64 n) (/.f64 (neg.f64 Om) (*.f64 l (*.f64 U (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)))))))) |
(*.f64 (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2)) (/.f64 (*.f64 n (*.f64 l (neg.f64 U))) (neg.f64 Om))) |
(sqrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 2)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(log.f64 (exp.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(cbrt.f64 (pow.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))) 3)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l U) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))))) 3) (pow.f64 Om 3))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(expm1.f64 (log1p.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(exp.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n))))) 1)) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
(log1p.f64 (expm1.f64 (/.f64 (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om l) (-.f64 U* U)))) (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 l U)) Om) (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om l)) (-.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 l Om) (*.f64 n U)) (fma.f64 l -2 (*.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l))))) |
(*.f64 (*.f64 (*.f64 l U) (/.f64 n Om)) (fma.f64 (-.f64 U* U) (/.f64 n (/.f64 Om l)) (*.f64 l -2))) |
Compiled 41896 to 18339 computations (56.2% saved)
88 alts after pruning (83 fresh and 5 done)
| Pruned | Kept | Total | |
|---|---|---|---|
| New | 1162 | 32 | 1194 |
| Fresh | 16 | 51 | 67 |
| Picked | 1 | 0 | 1 |
| Done | 0 | 5 | 5 |
| Total | 1179 | 88 | 1267 |
| Status | Accuracy | Program |
|---|---|---|
| 4.5% | (fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*)))))) | |
| 9.4% | (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2)))))))) | |
| ▶ | 47.0% | (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) |
| 24.0% | (pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) | |
| 36.6% | (pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) | |
| 34.0% | (pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) | |
| 35.6% | (pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) | |
| 34.2% | (pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) | |
| 36.4% | (pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) | |
| 6.9% | (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) | |
| 6.9% | (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) | |
| 12.0% | (/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) | |
| 12.1% | (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) | |
| 3.0% | (/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) | |
| 4.1% | (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) | |
| 10.8% | (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om)))) | |
| ✓ | 11.2% | (*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| 11.2% | (*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) | |
| 5.8% | (*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) | |
| 11.6% | (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) | |
| 12.8% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) | |
| 7.7% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) | |
| ▶ | 10.8% | (*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
| 31.0% | (*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) | |
| 2.5% | (*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) | |
| 6.3% | (*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) | |
| 5.2% | (*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) | |
| 26.5% | (*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) | |
| 22.3% | (*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) | |
| 22.5% | (*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) | |
| 26.4% | (*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) | |
| 26.6% | (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) | |
| 25.4% | (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) | |
| 22.3% | (*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) | |
| 8.9% | (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) | |
| 8.5% | (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) | |
| 9.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) | |
| 6.9% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) | |
| 10.5% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) | |
| 6.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om)))) | |
| 5.4% | (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) | |
| 5.8% | (*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) | |
| 6.4% | (*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) | |
| 13.5% | (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) | |
| 7.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) | |
| 13.6% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) | |
| 7.1% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) | |
| 7.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) | |
| 36.7% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) | |
| 2.9% | (*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) | |
| 35.8% | (sqrt.f64 (pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) 2)) (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) | |
| ▶ | 2.8% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 5.9% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) | |
| 6.5% | (sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) | |
| ▶ | 14.3% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
| 8.7% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) | |
| 2.5% | (sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) | |
| ✓ | 10.4% | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 10.9% | (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) | |
| 7.7% | (sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) | |
| 8.0% | (sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) | |
| 13.3% | (sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) | |
| ▶ | 39.6% | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| ✓ | 38.6% | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 15.2% | (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) | |
| 15.2% | (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) | |
| 43.0% | (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) | |
| 7.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) | |
| 14.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))))) | |
| 13.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) | |
| 11.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) | |
| 12.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) | |
| 6.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) | |
| 43.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) | |
| ✓ | 36.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 42.4% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) | |
| 12.9% | (sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) | |
| ✓ | 47.3% | (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
| 4.9% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) | |
| 5.8% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) | |
| 10.6% | (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) | |
| 42.4% | (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) | |
| 14.3% | (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) | |
| 7.0% | (sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) | |
| 10.8% | (neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) | |
| 34.4% | (exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) | |
| 4.9% | (exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) | |
| 6.1% | (exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
Compiled 4404 to 3068 computations (30.3% saved)
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 92.1% | (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
| ✓ | 86.4% | (*.f64 (-.f64 U* U) (/.f64 l Om)) |
| ✓ | 83.4% | (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
| ✓ | 65.1% | (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
Compiled 149 to 45 computations (69.8% saved)
63 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 5.0ms | U* | @ | inf | (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
| 3.0ms | U* | @ | -inf | (*.f64 (-.f64 U* U) (/.f64 l Om)) |
| 3.0ms | l | @ | inf | (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
| 3.0ms | l | @ | -inf | (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
| 2.0ms | U* | @ | 0 | (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
| 1× | batch-egg-rewrite |
| 1278× | prod-diff |
| 848× | expm1-udef |
| 480× | add-sqr-sqrt |
| 468× | pow1 |
| 466× | *-un-lft-identity |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 22 | 180 |
| 1 | 472 | 180 |
| 2 | 6120 | 180 |
| 1× | node limit |
| Inputs |
|---|
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 1 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4) (pow.f64 (*.f64 n (*.f64 U 2)) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 1/4) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 1 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) 1/4) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4) (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 2) 1/4) (pow.f64 (*.f64 n U) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((sqrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (exp.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((expm1.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log1p.f64 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f))) |
(((+.f64 (*.f64 (*.f64 n (*.f64 U 2)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) (*.f64 (*.f64 n (*.f64 U 2)) t)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) (*.f64 n (*.f64 U 2))) (*.f64 t (*.f64 n (*.f64 U 2)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 (*.f64 n U)) 2) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3) (pow.f64 (*.f64 n (*.f64 U 2)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f))) |
(((+.f64 (*.f64 (/.f64 l Om) U*) (*.f64 (/.f64 l Om) (neg.f64 U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((+.f64 (*.f64 U* (/.f64 l Om)) (*.f64 (neg.f64 U) (/.f64 l Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (-.f64 U* U) (/.f64 Om l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 1 (/.f64 Om (*.f64 l (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (*.f64 (/.f64 Om l) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (*.f64 (/.f64 Om l) (+.f64 U* U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 l (-.f64 U* U)) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 l (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 Om (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 l (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 Om (+.f64 U* U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (neg.f64 l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 (neg.f64 Om) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (neg.f64 l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 (neg.f64 Om) (+.f64 U* U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) l) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) 1) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (/.f64 Om l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (neg.f64 l)) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) l) (*.f64 (+.f64 U* U) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) 1) (*.f64 (+.f64 U* U) (/.f64 Om l))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (neg.f64 l)) (*.f64 (+.f64 U* U) (neg.f64 Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (neg.f64 (*.f64 l (-.f64 U* U))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (/.f64 l Om) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (/.f64 l Om) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 U* U) (neg.f64 l)) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (neg.f64 l) (-.f64 U* U)) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (/.f64 l Om)) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (/.f64 l Om)) (+.f64 U* U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (/.f64 (*.f64 l (-.f64 U* U)) 1) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (-.f64 U* U) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (/.f64 l Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (*.f64 n (-.f64 U* U)) l) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (*.f64 n (-.f64 U* U)) 1) (/.f64 Om l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((/.f64 (*.f64 (*.f64 l (-.f64 U* U)) n) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (pow.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U)) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) (pow.f64 n 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) (*.f64 (-.f64 U* U) (/.f64 l Om)) (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) #f))) |
| 1× | egg-herbie |
| 1344× | associate-*l* |
| 1224× | fma-def |
| 764× | associate-*r/ |
| 730× | *-commutative |
| 652× | distribute-lft-in |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 953 | 37020 |
| 1 | 3178 | 33404 |
| 1× | node limit |
| Inputs |
|---|
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2))) (*.f64 1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2)))) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2))) (*.f64 1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2)))) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))) (+.f64 (*.f64 1/12 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))) (*.f64 1/384 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))))) (pow.f64 l 6)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (*.f64 1/32 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 4)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (*.f64 1/32 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))) (/.f64 (*.f64 (+.f64 (*.f64 1/12 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (+.f64 (*.f64 1/384 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (*.f64 -1/32 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 6))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om))))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2)))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))) (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))) (pow.f64 l 6)) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) |
(+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) |
(+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (+.f64 (*.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))) (*.f64 1/8 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2))))))))) |
(+.f64 (*.f64 (pow.f64 Om 3) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (-.f64 (+.f64 (*.f64 1/24 (-.f64 (*.f64 12 (/.f64 t (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 U* U) 2))))) (*.f64 16 (/.f64 1 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))))) (*.f64 -1/16 (/.f64 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2))))) (*.f64 n (-.f64 U* U))))) (*.f64 1/48 (/.f64 1 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3))))))) (+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (+.f64 (*.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))) (*.f64 1/8 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))))))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/24 (+.f64 (*.f64 12 (/.f64 (*.f64 n (*.f64 (pow.f64 l 4) (-.f64 U* U))) (pow.f64 t 2))) (*.f64 -16 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (+.f64 (*.f64 -1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3))) (*.f64 -1/16 (/.f64 (*.f64 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))) (pow.f64 l 2)) t)))) (pow.f64 Om 3))) (+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2)))))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 -1 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/24 (+.f64 (*.f64 -12 (/.f64 (*.f64 n (*.f64 (pow.f64 l 4) (-.f64 U* U))) (pow.f64 t 2))) (*.f64 16 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))) (pow.f64 l 2)) t)) (*.f64 1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (pow.f64 Om 3)))) (+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2)))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) |
(+.f64 (*.f64 (pow.f64 n 3) (*.f64 (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))) (*.f64 1/384 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 (pow.f64 n 2) (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 n 2)) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3))))))) (pow.f64 n 3)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 n 2)) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U)))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 3))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2))))) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2)))) (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2))))) (pow.f64 U* 2)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4)))) |
(+.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))) (*.f64 1/12 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))))) (pow.f64 U* 3))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2)))) (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2))))) (pow.f64 U* 2)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (pow.f64 U* 3)) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (pow.f64 U* 3))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))))))) |
(+.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (pow.f64 U 2))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))))) |
(+.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (pow.f64 U 2))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (*.f64 (pow.f64 U 3) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3))))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 2)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 2)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (/.f64 (*.f64 (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 3))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) (pow.f64 U 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6))))))) (pow.f64 U 3))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) (pow.f64 U 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))))) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4)) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (+.f64 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4) (*.f64 (pow.f64 t 2) (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)))) (*.f64 1/32 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2))))))) (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4))) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (+.f64 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4) (*.f64 (pow.f64 t 2) (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)))) (*.f64 1/32 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2))))))) (+.f64 (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4) (*.f64 (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))) (+.f64 (*.f64 1/384 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))) (*.f64 1/12 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))) (pow.f64 t 3)) (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t)))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))))) (pow.f64 t 2)) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (*.f64 1/384 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3)))))) (pow.f64 t 3)) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))))) (pow.f64 t 2)) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t)))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 2)) (+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (+.f64 (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 3))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(/.f64 (*.f64 l U*) Om) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(/.f64 (*.f64 l U*) Om) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(/.f64 (*.f64 l U*) Om) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(-.f64 (exp.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) 1) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 1) |
(*.f64 1 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4) (pow.f64 (*.f64 n (*.f64 U 2)) 1/4)) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 1/4) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4)) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8)) |
(*.f64 (pow.f64 1 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) 1/4) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) |
(*.f64 (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4) (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 2) 1/4) (pow.f64 (*.f64 n U) 1/4)) |
(sqrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(log.f64 (exp.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(log.f64 (+.f64 1 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)))) |
(cbrt.f64 (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 3)) |
(expm1.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(exp.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) 1)) |
(log1p.f64 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(+.f64 (*.f64 (*.f64 n (*.f64 U 2)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) (*.f64 (*.f64 n (*.f64 U 2)) t)) |
(+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) (*.f64 n (*.f64 U 2))) (*.f64 t (*.f64 n (*.f64 U 2)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) 1) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 3) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (*.f64 n U)) 2) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3) (pow.f64 (*.f64 n (*.f64 U 2)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(+.f64 (*.f64 (/.f64 l Om) U*) (*.f64 (/.f64 l Om) (neg.f64 U))) |
(+.f64 (*.f64 U* (/.f64 l Om)) (*.f64 (neg.f64 U) (/.f64 l Om))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) 1) |
(/.f64 (-.f64 U* U) (/.f64 Om l)) |
(/.f64 1 (/.f64 Om (*.f64 l (-.f64 U* U)))) |
(/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (*.f64 (/.f64 Om l) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (*.f64 (/.f64 Om l) (+.f64 U* U))) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(/.f64 (*.f64 l (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 Om (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(/.f64 (*.f64 l (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 Om (+.f64 U* U))) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 (neg.f64 Om) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 (neg.f64 Om) (+.f64 U* U))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) l) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) Om)) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) 1) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (/.f64 Om l))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (neg.f64 l)) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (neg.f64 Om))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) l) (*.f64 (+.f64 U* U) Om)) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) 1) (*.f64 (+.f64 U* U) (/.f64 Om l))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (neg.f64 l)) (*.f64 (+.f64 U* U) (neg.f64 Om))) |
(/.f64 (neg.f64 (*.f64 l (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (*.f64 (/.f64 l Om) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) |
(/.f64 (*.f64 (/.f64 l Om) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) |
(/.f64 (*.f64 (-.f64 U* U) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 U* U)) (neg.f64 Om)) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (/.f64 l Om)) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (/.f64 l Om)) (+.f64 U* U)) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) 1) Om) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 1) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 3) |
(pow.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 2)) |
(log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))))) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (-.f64 U* U) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (/.f64 l Om) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(exp.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) 1) |
(/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) l) Om) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) 1) (/.f64 Om l)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (*.f64 (*.f64 l (-.f64 U* U)) n) Om) |
(pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 1) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 3) |
(pow.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 2) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 2)) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U)) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3)) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) (pow.f64 n 3))) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
(exp.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
| Outputs |
|---|
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(fma.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om))))) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) |
(+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2))) (*.f64 1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2)))) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2) (*.f64 t t)) -3/32) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))))) |
(fma.f64 (*.f64 (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 2) (*.f64 t t)) -3/32) (*.f64 (pow.f64 l 4) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) (fma.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om))))) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4))) |
(+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2))) (*.f64 1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2) (pow.f64 t 2)))) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (+.f64 (*.f64 (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))) (+.f64 (*.f64 1/12 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))) (*.f64 1/384 (/.f64 (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3) (pow.f64 t 3))))) (pow.f64 l 6)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4)) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2) (*.f64 t t)) -3/32) (pow.f64 l 4)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (fma.f64 (*.f64 (fma.f64 -1/32 (/.f64 (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3) (pow.f64 t 3)) (*.f64 (/.f64 (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3) (pow.f64 t 3)) 11/128)) (pow.f64 l 6)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (*.f64 (*.f64 l l) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))))) |
(+.f64 (fma.f64 (*.f64 (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 2) (*.f64 t t)) -3/32) (*.f64 (pow.f64 l 4) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) (fma.f64 (*.f64 (/.f64 (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 3) (pow.f64 t 3)) 7/128) (*.f64 (pow.f64 l 6) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) (*.f64 (*.f64 l (*.f64 l (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)))) (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) 1/4)))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n)))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) |
(fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l)))))) |
(fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n)))))) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (*.f64 1/32 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 4)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))))) |
(fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) (/.f64 (*.f64 (/.f64 (*.f64 t t) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2)) -3/32) (/.f64 (pow.f64 l 4) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))))))) |
(+.f64 (fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n)))))) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))) (/.f64 (*.f64 (/.f64 (*.f64 t t) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 2)) -3/32) (/.f64 (pow.f64 l 4) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 t (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (*.f64 (pow.f64 l 2) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om)))))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2))) (*.f64 1/32 (/.f64 (pow.f64 t 2) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l)))))) (/.f64 (*.f64 (+.f64 (*.f64 1/12 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (+.f64 (*.f64 1/384 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))) (*.f64 -1/32 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))) 3))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 -2 (log.f64 (/.f64 1 l))))))) (pow.f64 l 6))))) |
(fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (+.f64 (/.f64 (*.f64 (/.f64 (*.f64 t t) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 2)) -3/32) (/.f64 (pow.f64 l 4) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l))))) (/.f64 (fma.f64 1/12 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3)) (*.f64 (/.f64 (pow.f64 t 3) (pow.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) 3)) -11/384)) (/.f64 (pow.f64 l 6) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) (*.f64 -2 (neg.f64 (log.f64 l)))))))))) |
(+.f64 (+.f64 (fma.f64 1/4 (*.f64 (/.f64 t (*.f64 l l)) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n)))))) (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))) (/.f64 (*.f64 (/.f64 (*.f64 t t) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 2)) -3/32) (/.f64 (pow.f64 l 4) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))))) (/.f64 (*.f64 (/.f64 (pow.f64 t 3) (pow.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) 3)) 7/128) (/.f64 (pow.f64 l 6) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 l)) (log.f64 (*.f64 2 (*.f64 U (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) n))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (*.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (*.f64 (*.f64 l l) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 t Om))))) |
(fma.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (*.f64 (*.f64 l l) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 t Om))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om)))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om))))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2)))))) |
(+.f64 (+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (*.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (*.f64 (*.f64 l l) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 t Om))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (pow.f64 l 4) (*.f64 (/.f64 (*.f64 Om Om) (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (*.f64 t t))) -3/32)))) |
(+.f64 (fma.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (*.f64 (*.f64 l l) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 t Om))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om)))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (pow.f64 l 4) (*.f64 (/.f64 (*.f64 Om Om) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 2) (*.f64 t t))) -3/32)))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 2) (pow.f64 t 2)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 2))))) (pow.f64 l 4)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (+.f64 (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3))) (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 3) (pow.f64 t 3)) (pow.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) 3)))))) (pow.f64 l 6)) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 -1 l))) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U)) Om)))))) (*.f64 Om t)) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) (pow.f64 l 2))))))) |
(+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (pow.f64 l 4) (*.f64 (/.f64 (*.f64 Om Om) (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (*.f64 t t))) -3/32))) (+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (+.f64 (*.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (*.f64 (*.f64 l l) (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (*.f64 t Om)))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))) Om))))) (/.f64 (pow.f64 l 6) (fma.f64 -1/384 (/.f64 (pow.f64 Om 3) (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3) (pow.f64 t 3))) (*.f64 (/.f64 (pow.f64 Om 3) (/.f64 (pow.f64 (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3) (pow.f64 t 3))) -5/96))))))) |
(+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (pow.f64 l 4) (*.f64 (/.f64 (*.f64 Om Om) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 2) (*.f64 t t))) -3/32))) (+.f64 (fma.f64 -1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (*.f64 (*.f64 l l) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 t Om))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om)))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 l)) (log.f64 (*.f64 -2 (/.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)) Om))))) (/.f64 (pow.f64 l 6) (*.f64 (/.f64 (pow.f64 Om 3) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) 3) (pow.f64 t 3))) -7/128))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) |
(+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (-.f64 U* U))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (-.f64 U* U))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2)))))) |
(+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (+.f64 (*.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))) (*.f64 1/8 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2))))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (-.f64 U* U))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (*.f64 (*.f64 Om Om) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (fma.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))))) (/.f64 4 (*.f64 (*.f64 n n) (pow.f64 (-.f64 U* U) 2)))) (/.f64 1/8 (*.f64 (*.f64 n n) (pow.f64 (-.f64 U* U) 2)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (-.f64 U* U))) (fma.f64 (*.f64 Om Om) (*.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (fma.f64 1/8 (fma.f64 2 (/.f64 (/.f64 t n) (*.f64 l (*.f64 l (-.f64 U* U)))) (/.f64 -4 (*.f64 n (*.f64 n (pow.f64 (-.f64 U* U) 2))))) (/.f64 1/8 (*.f64 n (*.f64 n (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))))) |
(+.f64 (*.f64 (pow.f64 Om 3) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (-.f64 (+.f64 (*.f64 1/24 (-.f64 (*.f64 12 (/.f64 t (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 U* U) 2))))) (*.f64 16 (/.f64 1 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))))) (*.f64 -1/16 (/.f64 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2))))) (*.f64 n (-.f64 U* U))))) (*.f64 1/48 (/.f64 1 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3))))))) (+.f64 (*.f64 -1/2 (/.f64 (*.f64 Om (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om)))))) (*.f64 n (-.f64 U* U)))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) (*.f64 -2 (log.f64 Om))))) (+.f64 (*.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (*.f64 4 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))) (*.f64 1/8 (/.f64 1 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 2)))))))))) |
(fma.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (-.f64 (fma.f64 1/24 (-.f64 (*.f64 12 (/.f64 t (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2))))) (/.f64 16 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) (*.f64 -1/16 (/.f64 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))))) (/.f64 4 (*.f64 (*.f64 n n) (pow.f64 (-.f64 U* U) 2)))) (*.f64 n (-.f64 U* U))))) (/.f64 1/48 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3))))) (fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (-.f64 U* U))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (*.f64 (*.f64 Om Om) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 Om)))) (fma.f64 1/8 (-.f64 (*.f64 2 (/.f64 t (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))))) (/.f64 4 (*.f64 (*.f64 n n) (pow.f64 (-.f64 U* U) 2)))) (/.f64 1/8 (*.f64 (*.f64 n n) (pow.f64 (-.f64 U* U) 2))))))))) |
(fma.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (fma.f64 1/24 (fma.f64 12 (/.f64 (/.f64 t (*.f64 n n)) (*.f64 l (*.f64 l (pow.f64 (-.f64 U* U) 2)))) (/.f64 -16 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -1/16 (/.f64 (fma.f64 2 (/.f64 (/.f64 t n) (*.f64 l (*.f64 l (-.f64 U* U)))) (/.f64 -4 (*.f64 n (*.f64 n (pow.f64 (-.f64 U* U) 2))))) (*.f64 n (-.f64 U* U))) (/.f64 -1/48 (*.f64 (pow.f64 n 3) (pow.f64 (-.f64 U* U) 3)))))) (fma.f64 -1/2 (*.f64 (/.f64 Om n) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (-.f64 U* U))) (fma.f64 (*.f64 Om Om) (*.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2))))) (fma.f64 1/8 (fma.f64 2 (/.f64 (/.f64 t n) (*.f64 l (*.f64 l (-.f64 U* U)))) (/.f64 -4 (*.f64 n (*.f64 n (pow.f64 (-.f64 U* U) 2))))) (/.f64 1/8 (*.f64 n (*.f64 n (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 Om) (log.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2)))))))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2))))) |
(+.f64 (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (*.f64 1/8 (+.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))))) (*.f64 Om Om)))) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (fma.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (/.f64 (fma.f64 1/8 (/.f64 (pow.f64 l 4) (*.f64 t t)) (+.f64 (*.f64 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) 1/4) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -1/2))) (*.f64 Om Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4))) |
(+.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/24 (+.f64 (*.f64 12 (/.f64 (*.f64 n (*.f64 (pow.f64 l 4) (-.f64 U* U))) (pow.f64 t 2))) (*.f64 -16 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (+.f64 (*.f64 -1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3))) (*.f64 -1/16 (/.f64 (*.f64 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))) (pow.f64 l 2)) t)))) (pow.f64 Om 3))) (+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2)))))) |
(fma.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (fma.f64 1/24 (fma.f64 12 (/.f64 (*.f64 (*.f64 n (pow.f64 l 4)) (-.f64 U* U)) (*.f64 t t)) (*.f64 -16 (/.f64 (pow.f64 l 6) (pow.f64 t 3)))) (fma.f64 -1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3)) (*.f64 -1/16 (/.f64 (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))) (/.f64 t (*.f64 l l)))))) (pow.f64 Om 3)) (+.f64 (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (*.f64 1/8 (+.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))))) (*.f64 Om Om))))) |
(fma.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (/.f64 (fma.f64 1/24 (fma.f64 12 (/.f64 (*.f64 (-.f64 U* U) (*.f64 (pow.f64 l 4) n)) (*.f64 t t)) (*.f64 -16 (/.f64 (pow.f64 l 6) (pow.f64 t 3)))) (fma.f64 -1/16 (/.f64 (fma.f64 2 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -4)) (/.f64 t (*.f64 l l))) (*.f64 (/.f64 (pow.f64 l 6) (pow.f64 t 3)) -1/48))) (pow.f64 Om 3)) (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (fma.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (/.f64 (fma.f64 1/8 (/.f64 (pow.f64 l 4) (*.f64 t t)) (+.f64 (*.f64 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) 1/4) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -1/2))) (*.f64 Om Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) |
(pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4)) |
(+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2))))) |
(+.f64 (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (*.f64 1/8 (+.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))))) (*.f64 Om Om)))) |
(fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (fma.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (/.f64 (fma.f64 1/8 (/.f64 (pow.f64 l 4) (*.f64 t t)) (+.f64 (*.f64 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) 1/4) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -1/2))) (*.f64 Om Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4))) |
(+.f64 (*.f64 -1 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/24 (+.f64 (*.f64 -12 (/.f64 (*.f64 n (*.f64 (pow.f64 l 4) (-.f64 U* U))) (pow.f64 t 2))) (*.f64 16 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))) (pow.f64 l 2)) t)) (*.f64 1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (pow.f64 Om 3)))) (+.f64 (*.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 2 U)) (pow.f64 t 3)) 1/4) (/.f64 (pow.f64 l 2) Om))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (+.f64 (*.f64 1/8 (/.f64 (pow.f64 l 4) (pow.f64 t 2))) (*.f64 1/8 (+.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))) t)) (*.f64 -4 (/.f64 (pow.f64 l 4) (pow.f64 t 2)))))) (pow.f64 Om 2)))))) |
(fma.f64 -1 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (fma.f64 1/24 (fma.f64 -12 (/.f64 (*.f64 (*.f64 n (pow.f64 l 4)) (-.f64 U* U)) (*.f64 t t)) (*.f64 16 (/.f64 (pow.f64 l 6) (pow.f64 t 3)))) (fma.f64 1/16 (/.f64 (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))) (/.f64 t (*.f64 l l))) (*.f64 1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3))))) (pow.f64 Om 3))) (+.f64 (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4)) (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 t U))) 1/4) (/.f64 (*.f64 1/8 (+.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) (fma.f64 2 (/.f64 n (/.f64 t (*.f64 (*.f64 l l) (-.f64 U* U)))) (/.f64 (*.f64 -4 (pow.f64 l 4)) (*.f64 t t))))) (*.f64 Om Om))))) |
(-.f64 (fma.f64 -1/2 (*.f64 (pow.f64 (/.f64 (*.f64 2 (*.f64 n U)) (pow.f64 t 3)) 1/4) (/.f64 (*.f64 l l) Om)) (fma.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (/.f64 (fma.f64 1/8 (/.f64 (pow.f64 l 4) (*.f64 t t)) (+.f64 (*.f64 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) 1/4) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -1/2))) (*.f64 Om Om)) (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4))) (/.f64 (*.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) (fma.f64 1/24 (fma.f64 16 (/.f64 (pow.f64 l 6) (pow.f64 t 3)) (/.f64 (*.f64 -12 (*.f64 (-.f64 U* U) (*.f64 (pow.f64 l 4) n))) (*.f64 t t))) (fma.f64 1/48 (/.f64 (pow.f64 l 6) (pow.f64 t 3)) (/.f64 (*.f64 1/16 (fma.f64 2 (/.f64 n (/.f64 t (*.f64 l (*.f64 l (-.f64 U* U))))) (*.f64 (/.f64 (pow.f64 l 4) (*.f64 t t)) -4))) (/.f64 t (*.f64 l l)))))) (pow.f64 Om 3))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))) |
(fma.f64 1/4 (*.f64 (/.f64 n (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))) (/.f64 (*.f64 (*.f64 l l) (*.f64 (-.f64 U* U) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n)))) |
(fma.f64 1/4 (*.f64 (/.f64 n (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)) (/.f64 (*.f64 (-.f64 U* U) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) (*.f64 l l))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n)))) |
(+.f64 (*.f64 (pow.f64 n 2) (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) |
(fma.f64 (*.f64 n n) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))) (*.f64 (*.f64 (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2)) (/.f64 (pow.f64 (-.f64 U* U) 2) (pow.f64 Om 4))) -3/32)) (fma.f64 1/4 (*.f64 (/.f64 n (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))) (/.f64 (*.f64 (*.f64 l l) (*.f64 (-.f64 U* U) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))))) |
(fma.f64 (*.f64 n n) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) (*.f64 (/.f64 (pow.f64 l 4) (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2)) (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (pow.f64 Om 4)) -3/32))) (fma.f64 1/4 (*.f64 (/.f64 n (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)) (/.f64 (*.f64 (-.f64 U* U) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) (*.f64 l l))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))))) |
(+.f64 (*.f64 (pow.f64 n 3) (*.f64 (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))) (*.f64 1/384 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 (pow.f64 n 2) (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)) (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n)))))) (+.f64 (*.f64 1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) (log.f64 n))))))) |
(fma.f64 (pow.f64 n 3) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))) (fma.f64 1/12 (*.f64 (/.f64 (pow.f64 l 6) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3)) (/.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 Om 6))) (*.f64 (*.f64 (/.f64 (pow.f64 l 6) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3)) (/.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 Om 6))) -11/384))) (fma.f64 (*.f64 n n) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))) (*.f64 (*.f64 (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2)) (/.f64 (pow.f64 (-.f64 U* U) 2) (pow.f64 Om 4))) -3/32)) (fma.f64 1/4 (*.f64 (/.f64 n (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))) (/.f64 (*.f64 (*.f64 l l) (*.f64 (-.f64 U* U) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n))))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) (log.f64 n)))))) |
(+.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) (+.f64 (*.f64 (pow.f64 n 3) (*.f64 (*.f64 (/.f64 (pow.f64 l 6) (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 3)) (/.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 Om 6))) 7/128)) (*.f64 (*.f64 n n) (*.f64 (/.f64 (pow.f64 l 4) (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2)) (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (pow.f64 Om 4)) -3/32))))) (fma.f64 1/4 (*.f64 (/.f64 n (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)) (/.f64 (*.f64 (-.f64 U* U) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))) (*.f64 l l))) (*.f64 Om Om))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) (log.f64 n))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U)))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (*.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))) (*.f64 (*.f64 Om Om) (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))))) |
(fma.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 Om Om) (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 n 2)) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (+.f64 (*.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))) (*.f64 (*.f64 Om Om) (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (*.f64 n n) (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 4)) (pow.f64 l 4)) (pow.f64 (-.f64 U* U) 2)) -3/32))))) |
(+.f64 (fma.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 Om Om) (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (*.f64 n n) (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2) (pow.f64 l 4)) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 (-.f64 U* U) 2)) -3/32))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3))))))) (pow.f64 n 3)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))))) (pow.f64 n 2)) (*.f64 1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 1 n)))))) (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (pow.f64 Om 2))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U)))))))) |
(+.f64 (+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (pow.f64 n 3) (fma.f64 1/384 (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) (*.f64 (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) 5/96)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n)))))) (+.f64 (*.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (*.f64 n (*.f64 (*.f64 l l) (-.f64 U* U))) (*.f64 (*.f64 Om Om) (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (neg.f64 (log.f64 n))))) (/.f64 (*.f64 n n) (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 4)) (pow.f64 l 4)) (pow.f64 (-.f64 U* U) 2)) -3/32))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (+.f64 (fma.f64 1/4 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 Om Om) (fma.f64 -2 (/.f64 (*.f64 l l) Om) t)))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (*.f64 n n) (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2) (pow.f64 l 4)) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 (-.f64 U* U) 2)) -3/32))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) (/.f64 (pow.f64 n 3) (*.f64 (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) 7/128))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) |
(fma.f64 1/4 (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) n) (/.f64 (*.f64 (*.f64 Om Om) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) (*.f64 (*.f64 l l) (-.f64 U* U)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) |
(fma.f64 1/4 (/.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om (*.f64 Om (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) |
(+.f64 (fma.f64 1/4 (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) n) (/.f64 (*.f64 (*.f64 Om Om) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) (*.f64 (*.f64 l l) (-.f64 U* U)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) (/.f64 (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 4)) (pow.f64 l 4)) (pow.f64 (-.f64 U* U) 2)) -3/32) (/.f64 (*.f64 n n) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) |
(+.f64 (fma.f64 1/4 (/.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om (*.f64 Om (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))) (/.f64 (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2) (pow.f64 l 4)) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 (-.f64 U* U) 2)) -3/32)) (/.f64 (*.f64 n n) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 3) (pow.f64 Om 6)) (*.f64 (pow.f64 l 6) (pow.f64 (-.f64 U* U) 3)))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 3))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 l 4) (pow.f64 (-.f64 U* U) 2))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))) (pow.f64 n 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) (*.f64 (pow.f64 Om 2) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))))) (*.f64 n (*.f64 (pow.f64 l 2) (-.f64 U* U))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))))) |
(fma.f64 -1 (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n))))) (fma.f64 1/32 (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) (*.f64 (*.f64 (/.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) -11/128))) (pow.f64 n 3)) (+.f64 (fma.f64 1/4 (*.f64 (/.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) n) (/.f64 (*.f64 (*.f64 Om Om) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) (*.f64 (*.f64 l l) (-.f64 U* U)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n)))))) (/.f64 (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) 2) (pow.f64 Om 4)) (pow.f64 l 4)) (pow.f64 (-.f64 U* U) 2)) -3/32) (/.f64 (*.f64 n n) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) (*.f64 U (-.f64 U* U)))))) (*.f64 -2 (log.f64 (/.f64 -1 n))))))))) |
(-.f64 (+.f64 (fma.f64 1/4 (/.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (/.f64 (*.f64 n (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om (*.f64 Om (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))) (/.f64 (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 2) (pow.f64 l 4)) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 (-.f64 U* U) 2)) -3/32)) (/.f64 (*.f64 n n) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))))) (/.f64 (*.f64 (*.f64 (/.f64 (pow.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) 3) (pow.f64 l 6)) (/.f64 (pow.f64 Om 6) (pow.f64 (-.f64 U* U) 3))) -7/128) (/.f64 (pow.f64 n 3) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om))))))))) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om))))) 1/4) |
(pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2))))) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om))))) 1/4) (*.f64 (*.f64 1/4 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3)) 1/4)) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*)))) |
(fma.f64 (*.f64 1/4 (pow.f64 (/.f64 (*.f64 2 (*.f64 U (pow.f64 n 5))) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3)) 1/4)) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*)) (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4)) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2)))) (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2))))) (pow.f64 U* 2)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4)))) |
(+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om))))) 1/4) (fma.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3)) 1/4) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*))) (*.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32) (*.f64 (*.f64 U* U*) (pow.f64 (*.f64 (*.f64 n 2) (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) 1/4))))) |
(+.f64 (fma.f64 (*.f64 1/4 (pow.f64 (/.f64 (*.f64 2 (*.f64 U (pow.f64 n 5))) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3)) 1/4)) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*)) (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4)) (*.f64 (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 Om 4)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2)) (*.f64 -3/32 (*.f64 U* U*))) (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4))) |
(+.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))) (*.f64 1/12 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)))))) (pow.f64 U* 3))) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4) (+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) 1/4) (/.f64 (*.f64 (pow.f64 l 2) U*) (pow.f64 Om 2)))) (*.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2))))) (pow.f64 U* 2)) (pow.f64 (*.f64 n (*.f64 2 (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) U))) 1/4))))) |
(fma.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) 1/4) (*.f64 (fma.f64 -1/32 (/.f64 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 n 3)) (pow.f64 Om 6)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3)) (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 n 3)) (pow.f64 Om 6)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3)) 11/128)) (pow.f64 U* 3)) (+.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om))))) 1/4) (fma.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 (pow.f64 n 5) (*.f64 2 U)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3)) 1/4) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*))) (*.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32) (*.f64 (*.f64 U* U*) (pow.f64 (*.f64 (*.f64 n 2) (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) 1/4)))))) |
(+.f64 (fma.f64 (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4) (*.f64 (*.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 6)) (/.f64 (pow.f64 l 6) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3))) 7/128) (pow.f64 U* 3)) (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4)) (fma.f64 (*.f64 1/4 (pow.f64 (/.f64 (*.f64 2 (*.f64 U (pow.f64 n 5))) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3)) 1/4)) (/.f64 (*.f64 l l) (/.f64 (*.f64 Om Om) U*)) (*.f64 (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 Om 4)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2)) (*.f64 -3/32 (*.f64 U* U*))) (pow.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) 1/4)))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) |
(fma.f64 1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) |
(fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) |
(+.f64 (fma.f64 1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32)))) |
(+.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2))) -3/32)))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (pow.f64 U* 3)) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 1 U*))) (log.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))))) |
(+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32))) (fma.f64 1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (*.f64 (*.f64 l l) U*))) (+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (fma.f64 1/384 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3) (pow.f64 l 6))) (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3) (pow.f64 l 6))) 5/96)) (/.f64 (pow.f64 U* 3) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (neg.f64 (log.f64 U*)) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))))))) |
(+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2))) -3/32))) (+.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (/.f64 (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3) (pow.f64 l 6))) 7/128) (/.f64 (pow.f64 U* 3) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U*) (log.f64 (*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) |
(pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) |
(fma.f64 1/4 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 n (*.f64 (*.f64 l l) U*)) (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) |
(fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))) |
(+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) |
(+.f64 (fma.f64 1/4 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 n (*.f64 (*.f64 l l) U*)) (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32)))) |
(+.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))) (/.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2))) -3/32)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))) (pow.f64 U* 3))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))))) (pow.f64 U* 2)) (+.f64 (*.f64 1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (+.f64 (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om) t) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2))))))))) (*.f64 n (*.f64 (pow.f64 l 2) U*)))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -1 (log.f64 (/.f64 -1 U*))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) U)) (pow.f64 Om 2)))))))))) |
(fma.f64 -1 (/.f64 (fma.f64 1/32 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3) (pow.f64 l 6))) (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 3) (pow.f64 l 6))) -11/128)) (/.f64 (pow.f64 U* 3) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))))) (+.f64 (fma.f64 1/4 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 n (*.f64 (*.f64 l l) U*)) (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))))) (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))))))))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -1 (log.f64 (/.f64 -1 U*)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)) 2))) -3/32))))) |
(-.f64 (+.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))) (/.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (/.f64 (*.f64 U* U*) (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 2))) -3/32)))) (/.f64 (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) 3) (pow.f64 l 6))) -7/128) (/.f64 (pow.f64 U* 3) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))))))) |
(fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))))) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))))))) |
(fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))) (*.f64 U (*.f64 l l))) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2)))))) |
(+.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (pow.f64 U 2))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))) (*.f64 U U)) (fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))))) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) -3/32) (*.f64 U (*.f64 U (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))))) (fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))) (*.f64 U (*.f64 l l))) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))))) |
(+.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 4)) (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (pow.f64 U 2))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) U))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) (*.f64 (pow.f64 U 3) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)))) (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 n 3) (pow.f64 l 6)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3))))))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))) (*.f64 U U)) (fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (*.f64 l l) (*.f64 U (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))))) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))) (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))))) (*.f64 (pow.f64 U 3) (fma.f64 1/32 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 n 3)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3))) (*.f64 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 n 3)) (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3))) -11/128))))))) |
(fma.f64 (*.f64 (*.f64 (/.f64 (*.f64 n n) (pow.f64 Om 4)) (/.f64 (pow.f64 l 4) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) -3/32) (*.f64 U (*.f64 U (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))))) (fma.f64 -1/4 (*.f64 (/.f64 n (*.f64 Om Om)) (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))))) (*.f64 U (*.f64 l l))) (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (*.f64 (+.f64 (*.f64 (pow.f64 U 3) (*.f64 (/.f64 (/.f64 (*.f64 (pow.f64 l 6) (pow.f64 n 3)) (pow.f64 Om 6)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 3)) -7/128)) 1) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 U) (log.f64 (*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2)))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (*.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) n) (/.f64 (*.f64 (*.f64 Om Om) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))) (*.f64 U (*.f64 l l)))))) |
(fma.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) n) (/.f64 (*.f64 Om (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 2)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (*.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) n) (/.f64 (*.f64 (*.f64 Om Om) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))) (*.f64 U (*.f64 l l)))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l)))))))))) |
(+.f64 (fma.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) n) (/.f64 (*.f64 Om (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))))) |
(+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 2)) (+.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2))))))) (*.f64 (pow.f64 Om 2) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (/.f64 (*.f64 (+.f64 (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))))) (exp.f64 (*.f64 1/4 (+.f64 (*.f64 -2 (log.f64 (/.f64 1 U))) (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))))))) (pow.f64 U 3))))) |
(+.f64 (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))))) (+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (fma.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) n) (/.f64 (*.f64 (*.f64 Om Om) (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))) (*.f64 U (*.f64 l l)))) (/.f64 (fma.f64 -1/12 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3) (pow.f64 l 6))) (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3) (pow.f64 l 6))) 11/384)) (/.f64 (pow.f64 U 3) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l)))))))))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) (+.f64 (fma.f64 -1/4 (*.f64 (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) n) (/.f64 (*.f64 Om (*.f64 Om (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))))) (*.f64 U (*.f64 l l)))) (/.f64 (*.f64 (/.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 3)) (pow.f64 l 6)) -7/128) (/.f64 (pow.f64 U 3) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (neg.f64 (log.f64 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U))))) |
(pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) |
(fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) |
(fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) (pow.f64 U 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))))) |
(fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (*.f64 U (*.f64 l l)))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))))) |
(+.f64 (fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) (*.f64 -3/32 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))))) (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (+.f64 (*.f64 1/384 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6)))) (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 Om 6) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 3)) (*.f64 (pow.f64 n 3) (pow.f64 l 6))))))) (pow.f64 U 3))) (+.f64 (*.f64 -1/4 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))) (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4)))) (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) 2)) (*.f64 (pow.f64 n 2) (pow.f64 l 4))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))) (pow.f64 U 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (*.f64 -2 (log.f64 (/.f64 -1 U))))))))) |
(fma.f64 -1 (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U))))) (fma.f64 1/12 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3) (pow.f64 l 6))) (*.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (/.f64 (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 3) (pow.f64 l 6))) -11/384))) (pow.f64 U 3)) (fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))) (*.f64 U (*.f64 l l)))) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)) 2))) -3/32) (/.f64 (*.f64 U U) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 l l))))) (*.f64 -2 (log.f64 (/.f64 -1 U)))))))))) |
(-.f64 (+.f64 (fma.f64 -1/4 (*.f64 (/.f64 (*.f64 Om Om) n) (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (*.f64 U (*.f64 l l)))) (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l))))))) (/.f64 (*.f64 (/.f64 (pow.f64 Om 4) (/.f64 (*.f64 (pow.f64 l 4) (*.f64 n n)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 2))) (*.f64 -3/32 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))))) (*.f64 U U))) (/.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 U)) (log.f64 (/.f64 (*.f64 -2 (*.f64 n n)) (/.f64 (*.f64 Om Om) (*.f64 l l)))))) (/.f64 (pow.f64 U 3) (*.f64 (/.f64 (*.f64 (/.f64 (pow.f64 Om 6) (pow.f64 n 3)) (pow.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) 3)) (pow.f64 l 6)) 7/128)))) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4) |
(pow.f64 (*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)))))) 1/4) |
(pow.f64 (*.f64 2 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U))))) 1/4) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4)) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3)) (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 2 U)) (pow.f64 l 3))) 1/4)) (pow.f64 (*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)))))) 1/4)) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3)) (/.f64 (*.f64 2 (*.f64 U (pow.f64 Om 3))) (pow.f64 l 3))) 1/4)) (pow.f64 (*.f64 2 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U))))) 1/4)) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (+.f64 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4) (*.f64 (pow.f64 t 2) (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)))) (*.f64 1/32 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2))))))) (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4))) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3)) (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 2 U)) (pow.f64 l 3))) 1/4)) (fma.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 2 (*.f64 U l))))) 1/4) (*.f64 (*.f64 t t) (*.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2))) -3/32)) (pow.f64 (*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)))))) 1/4))) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3)) (/.f64 (*.f64 2 (*.f64 U (pow.f64 Om 3))) (pow.f64 l 3))) 1/4)) (fma.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 2 l) U)))) 1/4) (*.f64 (/.f64 (/.f64 (*.f64 Om Om) (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) (*.f64 l l)) (*.f64 -3/32 (*.f64 t t))) (pow.f64 (*.f64 2 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U))))) 1/4))) |
(+.f64 (*.f64 1/4 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (pow.f64 Om 3) (*.f64 2 U))) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3))) 1/4) t)) (+.f64 (*.f64 (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4) (*.f64 (pow.f64 t 2) (+.f64 (*.f64 -1/8 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)))) (*.f64 1/32 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2))))))) (+.f64 (pow.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) 1/4) (*.f64 (*.f64 (+.f64 (*.f64 -1/32 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))) (+.f64 (*.f64 1/384 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))) (*.f64 1/12 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)))))) (pow.f64 t 3)) (pow.f64 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 2 (*.f64 l U)))) Om) 1/4))))) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3)) (/.f64 (*.f64 (pow.f64 Om 3) (*.f64 2 U)) (pow.f64 l 3))) 1/4)) (fma.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 2 (*.f64 U l))))) 1/4) (*.f64 (*.f64 t t) (*.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2))) -3/32)) (+.f64 (pow.f64 (*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)))))) 1/4) (*.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 2 (*.f64 U l))))) 1/4) (*.f64 (pow.f64 t 3) (fma.f64 -1/32 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3)) (pow.f64 l 3)) (*.f64 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3)) (pow.f64 l 3)) 11/128))))))) |
(fma.f64 1/4 (*.f64 t (pow.f64 (*.f64 (/.f64 n (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3)) (/.f64 (*.f64 2 (*.f64 U (pow.f64 Om 3))) (pow.f64 l 3))) 1/4)) (fma.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 2 l) U)))) 1/4) (*.f64 (/.f64 (/.f64 (*.f64 Om Om) (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) (*.f64 l l)) (*.f64 -3/32 (*.f64 t t))) (fma.f64 (pow.f64 (/.f64 n (/.f64 Om (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 2 l) U)))) 1/4) (*.f64 (pow.f64 t 3) (*.f64 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3) (pow.f64 l 3))) 7/128)) (pow.f64 (*.f64 2 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U))))) 1/4)))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t)))) |
(+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (*.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t)))))) t)))) |
(fma.f64 1/4 (/.f64 (*.f64 (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t)))) l) (*.f64 t Om)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t)))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))))) (pow.f64 t 2)) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (+.f64 (*.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t)))))) t))) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (/.f64 (*.f64 t t) (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32))))) |
(+.f64 (fma.f64 1/4 (/.f64 (*.f64 (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t)))) l) (*.f64 t Om)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t)))) (/.f64 (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) (*.f64 -3/32 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t))))) (*.f64 t t))) |
(+.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 1/12 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (+.f64 (*.f64 -1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (*.f64 1/384 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3)))))) (pow.f64 t 3)) (+.f64 (/.f64 (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))))) (pow.f64 t 2)) (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 1 t)))))) l)) (*.f64 Om t)))))) |
(+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (+.f64 (+.f64 (*.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t)))))) t))) (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (/.f64 (*.f64 t t) (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32)))) (/.f64 (*.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (neg.f64 (neg.f64 (log.f64 t))))) (fma.f64 1/12 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) -11/384))) (pow.f64 t 3)))) |
(+.f64 (fma.f64 1/4 (/.f64 (*.f64 (*.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t)))) l) (*.f64 t Om)) (/.f64 (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) (*.f64 -3/32 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t))))) (*.f64 t t))) (+.f64 (/.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t))) (/.f64 (pow.f64 t 3) (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) 7/128))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 2 (*.f64 n U))) (log.f64 t))))) |
(exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) |
(pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t))))) |
(pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t)))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) |
(fma.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t)))))) t)) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t)))))) |
(fma.f64 1/4 (*.f64 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))) t)) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 2)) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) |
(fma.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t)))))) t)) (+.f64 (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t))))) (/.f64 (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32) (/.f64 (*.f64 t t) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t))))))))) |
(+.f64 (fma.f64 1/4 (*.f64 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))) t)) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))) (/.f64 (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32) (/.f64 (*.f64 t t) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))))) |
(+.f64 (*.f64 1/4 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))))) (*.f64 Om t))) (+.f64 (/.f64 (*.f64 (+.f64 (*.f64 -1/8 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2))) (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 2) (pow.f64 l 2)) (pow.f64 Om 2)))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 2)) (+.f64 (*.f64 -1 (/.f64 (*.f64 (+.f64 (*.f64 1/32 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (+.f64 (*.f64 -1/384 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))) (*.f64 -1/12 (/.f64 (*.f64 (pow.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) 3) (pow.f64 l 3)) (pow.f64 Om 3))))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))) (pow.f64 t 3))) (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t))))))))) |
(fma.f64 1/4 (*.f64 (/.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t)))))) t)) (+.f64 (/.f64 (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32) (/.f64 (*.f64 t t) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t))))))) (fma.f64 -1 (/.f64 (fma.f64 1/32 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) (*.f64 (/.f64 (pow.f64 (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) -11/128)) (/.f64 (pow.f64 t 3) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t))))))) (pow.f64 (exp.f64 1/4) (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (neg.f64 (log.f64 (/.f64 -1 t)))))))) |
(+.f64 (fma.f64 1/4 (*.f64 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) Om) (/.f64 (*.f64 l (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))) t)) (/.f64 (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2) (/.f64 (*.f64 Om Om) (*.f64 l l))) -3/32) (/.f64 (*.f64 t t) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t))))))) (-.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t)))) (/.f64 (*.f64 (/.f64 (pow.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 3) (/.f64 (pow.f64 Om 3) (pow.f64 l 3))) -7/128) (/.f64 (pow.f64 t 3) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 n (*.f64 U -2))) (log.f64 (/.f64 -1 t)))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) |
(*.f64 2 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))) |
(*.f64 n (*.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) 2)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) (pow.f64 Om 2)) (*.f64 2 (/.f64 1 Om))))))) (*.f64 2 (*.f64 n (*.f64 t U)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))) (*.f64 n (*.f64 t U)))) |
(*.f64 2 (*.f64 n (+.f64 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 -2 Om)) (*.f64 U (*.f64 l l))) (*.f64 t U)))) |
(*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om)) |
(*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(/.f64 (*.f64 -2 (*.f64 (*.f64 l l) (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)))) Om) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (/.f64 (*.f64 -2 (*.f64 (*.f64 l l) (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (/.f64 (*.f64 -2 (*.f64 (*.f64 l l) (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)))) Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -2 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (+.f64 2 (*.f64 -1 (/.f64 (*.f64 n (-.f64 U* U)) Om))) U))) Om))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))))))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (/.f64 (*.f64 -2 (*.f64 (*.f64 l l) (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 n U)))) Om)) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))) |
(/.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2)) (*.f64 Om Om)) |
(+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2)))) |
(fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)))) |
(fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 2 (*.f64 n U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))))) |
(fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 t (*.f64 2 (*.f64 n U)))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (+.f64 (*.f64 -4 (/.f64 (*.f64 n (*.f64 (pow.f64 l 2) U)) Om)) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l)))) (*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))))) |
(fma.f64 2 (*.f64 n (*.f64 t U)) (fma.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 -4 (/.f64 n (/.f64 Om (*.f64 U (*.f64 l l))))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(*.f64 n (*.f64 (fma.f64 -2 (/.f64 (*.f64 l l) Om) t) (*.f64 2 U))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))) |
(/.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2)) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om))) |
(/.f64 (*.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 (*.f64 n n) 2)) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(+.f64 (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))) (pow.f64 Om 2))) (*.f64 2 (*.f64 n (*.f64 (+.f64 t (*.f64 -2 (/.f64 (pow.f64 l 2) Om))) U)))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 U* U)))) (*.f64 Om Om)) (*.f64 n (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))))))) |
(*.f64 2 (+.f64 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))))) (*.f64 n (*.f64 U (fma.f64 -2 (/.f64 (*.f64 l l) Om) t))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om))))) |
(*.f64 n (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 2 U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*))))) |
(*.f64 2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (*.f64 -2 l))) Om)) U))) (*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2)))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (*.f64 l -2))) Om)))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U*)))))) |
(*.f64 2 (fma.f64 n (*.f64 U (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om)))))) (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 (*.f64 l l) U*)))))) |
(*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(*.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om))))) |
(*.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U))))) |
(/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om)) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))) (pow.f64 Om 2)))) |
(fma.f64 2 (*.f64 n (*.f64 U (+.f64 t (/.f64 (*.f64 l (fma.f64 -2 l (/.f64 n (/.f64 Om (*.f64 l U*))))) Om)))) (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 U U)))))) |
(fma.f64 2 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (fma.f64 l -2 (/.f64 (*.f64 (*.f64 n l) U*) Om))))) (*.f64 n U)) (/.f64 (*.f64 -2 (*.f64 n (*.f64 n (*.f64 (*.f64 l l) (*.f64 U U))))) (*.f64 Om Om))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om)) |
(*.f64 2 (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)))))) |
(*.f64 2 (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 n (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 2 (*.f64 n U))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(+.f64 (*.f64 2 (*.f64 n (*.f64 t U))) (*.f64 2 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 2 (+.f64 (*.f64 n (*.f64 t U)) (/.f64 n (/.f64 Om (*.f64 (*.f64 U l) (+.f64 (*.f64 l -2) (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l))))))) |
(*.f64 2 (fma.f64 n (*.f64 t U) (/.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 Om (*.f64 l (*.f64 n U)))))) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(neg.f64 (/.f64 (*.f64 U l) Om)) |
(/.f64 (neg.f64 l) (/.f64 Om U)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l U*) Om) |
(*.f64 U* (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l U*) Om) |
(*.f64 U* (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l U*) Om) |
(*.f64 U* (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(neg.f64 (/.f64 (*.f64 U l) Om)) |
(/.f64 (neg.f64 l) (/.f64 Om U)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(*.f64 -1 (/.f64 (*.f64 l U) Om)) |
(neg.f64 (/.f64 (*.f64 U l) Om)) |
(/.f64 (neg.f64 l) (/.f64 Om U)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (/.f64 (*.f64 l U*) Om) (*.f64 -1 (/.f64 (*.f64 l U) Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 U l)))) |
(/.f64 (neg.f64 (*.f64 l (*.f64 n U))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(/.f64 (*.f64 (*.f64 n l) U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(/.f64 (*.f64 (*.f64 n l) U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(/.f64 (*.f64 n (*.f64 l U*)) Om) |
(/.f64 n (/.f64 Om (*.f64 l U*))) |
(/.f64 (*.f64 (*.f64 n l) U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 U l)))) |
(/.f64 (neg.f64 (*.f64 l (*.f64 n U))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) |
(neg.f64 (/.f64 n (/.f64 Om (*.f64 U l)))) |
(/.f64 (neg.f64 (*.f64 l (*.f64 n U))) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n (*.f64 l U)) Om)) (/.f64 (*.f64 n (*.f64 l U*)) Om)) |
(fma.f64 -1 (/.f64 n (/.f64 Om (*.f64 U l))) (/.f64 n (/.f64 Om (*.f64 l U*)))) |
(-.f64 (/.f64 (*.f64 (*.f64 n l) U*) Om) (/.f64 (*.f64 l (*.f64 n U)) Om)) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(-.f64 (exp.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) 1) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 1) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(*.f64 1 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4)) (cbrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)))))) |
(*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4) (pow.f64 (*.f64 n (*.f64 U 2)) 1/4)) |
(*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) |
(*.f64 (pow.f64 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) |
(*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 1/4) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 1/4)) |
(*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) |
(*.f64 (pow.f64 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/8)) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(*.f64 (pow.f64 1 1/4) (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) 1/4) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 2) 1/4) (pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/4)) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)))) 2) 1/4) (pow.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)))) 1/4)) |
(*.f64 (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4) (pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1/4)) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2) |
(sqrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))))) |
(*.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 2) 1/4) (pow.f64 (*.f64 n U) 1/4)) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t)) 1/4) (pow.f64 (*.f64 n U) 1/4)) |
(*.f64 (pow.f64 (*.f64 2 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)) 1/4) (pow.f64 (*.f64 n U) 1/4)) |
(sqrt.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U)))) 1/2) |
(sqrt.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))))) |
(log.f64 (exp.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(log.f64 (+.f64 1 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(cbrt.f64 (pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4) 3)) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(expm1.f64 (log1p.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(exp.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4)) 1)) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(log1p.f64 (expm1.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1/4))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) |
(pow.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) 1/4) |
(+.f64 (*.f64 (*.f64 n (*.f64 U 2)) (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) (*.f64 (*.f64 n (*.f64 U 2)) t)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(+.f64 (*.f64 (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) (*.f64 n (*.f64 U 2))) (*.f64 t (*.f64 n (*.f64 U 2)))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) 1) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 1) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(pow.f64 (cbrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 3) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3) 1/3) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(pow.f64 (sqrt.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 2) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 2)) |
(fabs.f64 (*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t)))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (*.f64 n U)) 2) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (log.f64 (pow.f64 (pow.f64 (exp.f64 n) U) 2))) |
(*.f64 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t) (*.f64 2 (log.f64 (pow.f64 (exp.f64 n) U)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(cbrt.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))) 3)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(cbrt.f64 (*.f64 (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3) (pow.f64 (*.f64 n (*.f64 U 2)) 3))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 U 2)) 3) (pow.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) 3))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(expm1.f64 (log1p.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(exp.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2)))) 1)) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(log1p.f64 (expm1.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) t) (*.f64 n (*.f64 U 2))))) |
(*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) |
(*.f64 2 (*.f64 (*.f64 n U) (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t))) |
(+.f64 (*.f64 (/.f64 l Om) U*) (*.f64 (/.f64 l Om) (neg.f64 U))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(+.f64 (*.f64 U* (/.f64 l Om)) (*.f64 (neg.f64 U) (/.f64 l Om))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) 1) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (-.f64 U* U) (/.f64 Om l)) |
(*.f64 (/.f64 (-.f64 U* U) Om) l) |
(/.f64 1 (/.f64 Om (*.f64 l (-.f64 U* U)))) |
(*.f64 (/.f64 1 Om) (*.f64 l (-.f64 U* U))) |
(/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (*.f64 (/.f64 Om l) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (*.f64 (/.f64 Om l) (+.f64 U* U))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 l (-.f64 U* U)) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (*.f64 l (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 Om (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (*.f64 l (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 Om (+.f64 U* U))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (*.f64 (neg.f64 Om) (fma.f64 U* U* (*.f64 U (+.f64 U* U))))) |
(*.f64 (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*)))) (/.f64 (neg.f64 l) (neg.f64 Om))) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 (*.f64 U* U*) (*.f64 U U))) (*.f64 (neg.f64 Om) (+.f64 U* U))) |
(*.f64 (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*)) (/.f64 (neg.f64 l) (neg.f64 Om))) |
(/.f64 (neg.f64 l) (/.f64 (*.f64 Om (neg.f64 (+.f64 U U*))) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) l) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) Om)) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) 1) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (/.f64 Om l))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (neg.f64 l)) (*.f64 (fma.f64 U* U* (*.f64 U (+.f64 U* U))) (neg.f64 Om))) |
(*.f64 (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*)))) (/.f64 (neg.f64 l) (neg.f64 Om))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) l) (*.f64 (+.f64 U* U) Om)) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) 1) (*.f64 (+.f64 U* U) (/.f64 Om l))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (neg.f64 l)) (*.f64 (+.f64 U* U) (neg.f64 Om))) |
(*.f64 (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*)) (/.f64 (neg.f64 l) (neg.f64 Om))) |
(/.f64 (neg.f64 l) (/.f64 (*.f64 Om (neg.f64 (+.f64 U U*))) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (neg.f64 (*.f64 l (-.f64 U* U))) (neg.f64 Om)) |
(/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) (neg.f64 l))) |
(/.f64 (*.f64 (/.f64 l Om) (-.f64 (pow.f64 U* 3) (pow.f64 U 3))) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (*.f64 (/.f64 l Om) (-.f64 (*.f64 U* U*) (*.f64 U U))) (+.f64 U* U)) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (*.f64 (-.f64 U* U) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) (neg.f64 l))) |
(/.f64 (*.f64 (neg.f64 l) (-.f64 U* U)) (neg.f64 Om)) |
(/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) (neg.f64 l))) |
(/.f64 (*.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (/.f64 l Om)) (fma.f64 U* U* (*.f64 U (+.f64 U* U)))) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (pow.f64 U* 3) (pow.f64 U 3)) (fma.f64 U* U* (*.f64 U (+.f64 U U*))))) |
(/.f64 (*.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (/.f64 l Om)) (+.f64 U* U)) |
(*.f64 (/.f64 l Om) (/.f64 (-.f64 (*.f64 U* U*) (*.f64 U U)) (+.f64 U U*))) |
(/.f64 (/.f64 l Om) (/.f64 (+.f64 U U*) (-.f64 (*.f64 U* U*) (*.f64 U U)))) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) 1) Om) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (cbrt.f64 (*.f64 Om Om))) (cbrt.f64 Om)) |
(/.f64 (*.f64 l (-.f64 U* U)) (*.f64 (cbrt.f64 Om) (cbrt.f64 (*.f64 Om Om)))) |
(/.f64 (/.f64 (*.f64 l (-.f64 U* U)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 1) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(pow.f64 (cbrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 3) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(pow.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) 1/3) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(pow.f64 (sqrt.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 2) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(sqrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 2)) |
(sqrt.f64 (pow.f64 (*.f64 (-.f64 U* U) (/.f64 l Om)) 2)) |
(fabs.f64 (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(log.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(cbrt.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3)) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 l Om) 3) (pow.f64 (-.f64 U* U) 3))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(cbrt.f64 (*.f64 (pow.f64 (-.f64 U* U) 3) (pow.f64 (/.f64 l Om) 3))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(expm1.f64 (log1p.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(exp.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(exp.f64 (*.f64 (log.f64 (*.f64 (/.f64 l Om) (-.f64 U* U))) 1)) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(log1p.f64 (expm1.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)))) |
(+.f64 (neg.f64 (/.f64 (*.f64 U l) Om)) (*.f64 U* (/.f64 l Om))) |
(*.f64 (-.f64 U* U) (/.f64 l Om)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) 1) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (-.f64 U* U)) (/.f64 Om l)) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) l) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) 1) (/.f64 Om l)) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(/.f64 (*.f64 (*.f64 n (-.f64 U* U)) (neg.f64 l)) (neg.f64 Om)) |
(/.f64 (*.f64 n (-.f64 U* U)) (/.f64 (neg.f64 Om) (neg.f64 l))) |
(/.f64 (*.f64 (*.f64 l (-.f64 U* U)) n) Om) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 1) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 3) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(pow.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3) 1/3) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(pow.f64 (sqrt.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 2) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(sqrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 2)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) 2)) |
(fabs.f64 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) |
(log.f64 (pow.f64 (pow.f64 (exp.f64 (/.f64 l Om)) (-.f64 U* U)) n)) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)) 3)) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(cbrt.f64 (*.f64 (pow.f64 n 3) (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 (/.f64 l Om) (-.f64 U* U)) 3) (pow.f64 n 3))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(exp.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U))) 1)) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 n (/.f64 l Om)) (-.f64 U* U)))) |
(*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l) |
(*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om))) |
Found 2 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 92.6% | (*.f64 (*.f64 n t) (*.f64 2 U)) |
| ✓ | 72.8% | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
Compiled 31 to 17 computations (45.2% saved)
18 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 0.0ms | n | @ | 0 | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| 0.0ms | U | @ | -inf | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| 0.0ms | t | @ | -inf | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| 0.0ms | n | @ | -inf | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| 0.0ms | t | @ | inf | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| 1× | batch-egg-rewrite |
| 1142× | log-prod |
| 892× | prod-exp |
| 832× | exp-prod |
| 804× | pow-prod-down |
| 542× | pow-prod-up |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 11 | 42 |
| 1 | 221 | 42 |
| 2 | 2612 | 42 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (*.f64 n t) (*.f64 2 U)) |
| Outputs |
|---|
(((+.f64 0 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (sqrt.f64 (*.f64 n t)) (sqrt.f64 (+.f64 U U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 t (+.f64 U U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (*.f64 t 2))) (sqrt.f64 U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f))) |
(((+.f64 0 (*.f64 n (*.f64 t (+.f64 U U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 2/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 4) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 n t)) (*.f64 (log.f64 (+.f64 U U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (log.f64 (+.f64 U U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (*.f64 (log.f64 (+.f64 U U)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 n (*.f64 t 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (+.f64 U U)) (*.f64 (log.f64 (*.f64 n t)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (log.f64 (*.f64 n t)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (*.f64 (log.f64 (*.f64 n t)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 t 2))) (*.f64 (log.f64 U) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((exp.f64 (+.f64 (log.f64 (*.f64 t (+.f64 U U))) (*.f64 (log.f64 n) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (*.f64 (*.f64 n t) (*.f64 2 U))) #f))) |
| 1× | egg-herbie |
| 1140× | log-prod |
| 1084× | fma-def |
| 980× | unswap-sqr |
| 934× | distribute-lft-in |
| 902× | distribute-rgt-in |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 217 | 2840 |
| 1 | 453 | 2764 |
| 2 | 1231 | 2764 |
| 3 | 6729 | 2764 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(+.f64 0 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 1) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) |
(*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (*.f64 n t)) (sqrt.f64 (+.f64 U U))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 t (+.f64 U U)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 t 2))) (sqrt.f64 U)) |
(pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 3) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3/2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/6) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(fabs.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1/2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) 3)) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(+.f64 0 (*.f64 n (*.f64 t (+.f64 U U)))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) |
(pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 6) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 2/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 4) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 2)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 2)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 3)) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) 1/2)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) |
(exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 t (+.f64 U U))))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n t)) (*.f64 (log.f64 (+.f64 U U)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (log.f64 (+.f64 U U)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (*.f64 (log.f64 (+.f64 U U)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 n (*.f64 t 2))))) |
(exp.f64 (+.f64 (log.f64 (+.f64 U U)) (*.f64 (log.f64 (*.f64 n t)) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (log.f64 (*.f64 n t)))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (*.f64 (log.f64 (*.f64 n t)) 1))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 t 2))) (*.f64 (log.f64 U) 1))) |
(exp.f64 (+.f64 (log.f64 (*.f64 t (+.f64 U U))) (*.f64 (log.f64 n) 1))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
| Outputs |
|---|
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(+.f64 0 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) |
(*.f64 3 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))))) |
(*.f64 (log.f64 (cbrt.f64 (exp.f64 (sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n))))))) 3) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (log.f64 (sqrt.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 1) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 1 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (*.f64 n t)) (sqrt.f64 (+.f64 U U))) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 t (+.f64 U U)))) |
(*.f64 (sqrt.f64 n) (sqrt.f64 (*.f64 2 (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 t 2))) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 2 t))) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 n t))) (sqrt.f64 U)) |
(pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/2) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 3) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3/2) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 1/3) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/6) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (exp.f64 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U))))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n))))))) (sqrt.f64 (log.f64 (sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n))))))) |
(fabs.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1/2)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 1)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 1)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6)) 3)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 3/2 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(exp.f64 (*.f64 (*.f64 1/4 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) |
(sqrt.f64 (*.f64 t (*.f64 U (*.f64 2 n)))) |
(+.f64 0 (*.f64 n (*.f64 t (+.f64 U U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(+.f64 (log.f64 (pow.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) 2)) (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) |
(*.f64 3 (log.f64 (cbrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U))) (log.f64 (sqrt.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/6) 6) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3/2) 2/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/2) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3) 1/3) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 4) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (exp.f64 1) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) (cbrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) 2)) (cbrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 t (*.f64 U (*.f64 2 n))))) 2)) (cbrt.f64 (log.f64 (*.f64 t (*.f64 U (*.f64 2 n)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) (sqrt.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) (sqrt.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))))) |
(pow.f64 (exp.f64 (sqrt.f64 (log.f64 (*.f64 t (*.f64 U (*.f64 2 n)))))) (sqrt.f64 (log.f64 (*.f64 t (*.f64 U (*.f64 2 n)))))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(log.f64 (pow.f64 (pow.f64 (pow.f64 (exp.f64 t) 2) n) U)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U)))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1) 1)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) 2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (log.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2)) 1/2)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1/3)) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 n) 1) (log.f64 (*.f64 t (+.f64 U U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n t)) (*.f64 (log.f64 (+.f64 U U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (log.f64 (+.f64 U U)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n t)) 1) (*.f64 (log.f64 (+.f64 U U)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 U) 1) (log.f64 (*.f64 n (*.f64 t 2))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (+.f64 U U)) (*.f64 (log.f64 (*.f64 n t)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (log.f64 (*.f64 n t)))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (+.f64 U U)) 1) (*.f64 (log.f64 (*.f64 n t)) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1) (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 t (+.f64 U U))))) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 n (*.f64 t 2))) (*.f64 (log.f64 U) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(exp.f64 (+.f64 (log.f64 (*.f64 t (+.f64 U U))) (*.f64 (log.f64 n) 1))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 2 (*.f64 n (*.f64 t U))) |
(*.f64 t (*.f64 U (*.f64 2 n))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 88.9% | (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
| ✓ | 88.9% | (/.f64 (-.f64 U* U) (/.f64 Om n)) |
| ✓ | 87.5% | (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
| ✓ | 56.0% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
Compiled 121 to 31 computations (74.4% saved)
54 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 1.0ms | U* | @ | inf | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
| 1.0ms | Om | @ | inf | (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
| 1.0ms | Om | @ | 0 | (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
| 1.0ms | U | @ | 0 | (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
| 1.0ms | n | @ | 0 | (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
| 1× | batch-egg-rewrite |
| 1846× | prod-diff |
| 500× | add-sqr-sqrt |
| 488× | pow1 |
| 488× | *-un-lft-identity |
| 462× | add-exp-log |
Useful iterations: 0 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 21 | 164 |
| 1 | 481 | 164 |
| 2 | 7284 | 164 |
| 1× | node limit |
| Inputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) |
(/.f64 (-.f64 U* U) (/.f64 Om n)) |
(/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 1 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 -2) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))) 1/2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((/.f64 1 (/.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((fabs.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (exp.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 Om (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 1 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om U) (/.f64 1 (*.f64 l (*.f64 l n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 U) (/.f64 Om (*.f64 l (*.f64 l n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (*.f64 l (*.f64 l n))) (/.f64 Om U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 Om (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 l n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 l (*.f64 l n))) (/.f64 (cbrt.f64 Om) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U l)) (/.f64 (cbrt.f64 Om) (*.f64 l n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n))) (/.f64 (sqrt.f64 Om) U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U l)) (/.f64 (sqrt.f64 Om) (*.f64 l n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n)))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 l (*.f64 l n))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f))) |
(((+.f64 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((-.f64 (*.f64 U* (/.f64 n Om)) (*.f64 U (/.f64 n Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 n (/.f64 (-.f64 U* U) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (-.f64 U* U) (/.f64 n Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 1 (*.f64 n (/.f64 (-.f64 U* U) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (*.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 n Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (-.f64 U* U)) (*.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 n Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (neg.f64 (-.f64 U* U)) (/.f64 1 (/.f64 (neg.f64 Om) n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 n Om) (-.f64 U* U)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (-.f64 U* U) Om) n) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) 1) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 Om n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) 1) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 Om n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) Om) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 1 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 Om) (/.f64 (-.f64 U* U) (/.f64 1 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (-.f64 U* U) (cbrt.f64 (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 (-.f64 U* U) (sqrt.f64 (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) Om) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 1 n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 (-.f64 U* U)) (sqrt.f64 (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 (-.f64 U* U)) (cbrt.f64 (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) 1) n) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (sqrt.f64 n)) (sqrt.f64 n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (-.f64 U* U) 1) (/.f64 n Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (-.f64 U* U) (neg.f64 Om)) (neg.f64 n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (/.f64 (/.f64 Om n) (-.f64 U* U)) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((neg.f64 (/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (pow.f64 (exp.f64 (/.f64 (-.f64 U* U) Om)) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 Om (/.f64 1 (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 Om (*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 1 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (neg.f64 (/.f64 Om U)) (*.f64 l (*.f64 l n))) (/.f64 1 (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om 1) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 Om (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 1 (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) 1) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 8 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3))) (+.f64 4 (*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 4 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2))) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((neg.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((sqrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (exp.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((cbrt.f64 (/.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) (pow.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((expm1.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f)) ((log1p.f64 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (/.f64 (-.f64 U* U) (/.f64 Om n)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))) #f))) |
| 1× | egg-herbie |
| 1398× | times-frac |
| 804× | +-commutative |
| 752× | fma-def |
| 646× | fma-udef |
| 594× | *-commutative |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 1556 | 64000 |
| 1 | 4246 | 60432 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U))))) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3) (sqrt.f64 -2)))) (*.f64 (pow.f64 n 2) (pow.f64 U 2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U)))))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 U 2))))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) |
(+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5)))))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 5) (pow.f64 Om 7)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 3))))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2)))))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 (*.f64 n U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 (*.f64 n U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 (*.f64 n U*) Om) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) |
(-.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U 2)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 4))))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 -1/16 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U)))))) |
(/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))) (*.f64 -8 (/.f64 Om (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4) U)))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 Om (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 Om (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U* 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 4) (*.f64 (pow.f64 l 2) U))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) 1) |
(*.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(*.f64 1 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(*.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(*.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4)) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))))) |
(*.f64 (sqrt.f64 -2) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) 1/2)) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) |
(*.f64 (pow.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))) 1/2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 -2))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/2) |
(pow.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 3) |
(pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2) 1/3) |
(pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) 2) |
(fabs.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))))) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 1)) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(*.f64 Om (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) |
(*.f64 1 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) Om) |
(*.f64 (/.f64 Om U) (/.f64 1 (*.f64 l (*.f64 l n)))) |
(*.f64 (/.f64 1 U) (/.f64 Om (*.f64 l (*.f64 l n)))) |
(*.f64 (/.f64 1 (*.f64 l (*.f64 l n))) (/.f64 Om U)) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 Om (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 l n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 l (*.f64 l n))) (/.f64 (cbrt.f64 Om) U)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U l)) (/.f64 (cbrt.f64 Om) (*.f64 l n))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n)))) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n))) (/.f64 (sqrt.f64 Om) U)) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U l)) (/.f64 (sqrt.f64 Om) (*.f64 l n))) |
(pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 3) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) |
(pow.f64 (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n)))) -1) |
(neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 2)) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))))) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 l (*.f64 l n))) 3))) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(+.f64 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(-.f64 (*.f64 U* (/.f64 n Om)) (*.f64 U (/.f64 n Om))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(*.f64 n (/.f64 (-.f64 U* U) Om)) |
(*.f64 (-.f64 U* U) (/.f64 n Om)) |
(*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) |
(*.f64 1 (*.f64 n (/.f64 (-.f64 U* U) Om))) |
(*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (*.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 n Om))) |
(*.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(*.f64 (sqrt.f64 (-.f64 U* U)) (*.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 n Om))) |
(*.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(*.f64 (neg.f64 (-.f64 U* U)) (/.f64 1 (/.f64 (neg.f64 Om) n))) |
(*.f64 (/.f64 n Om) (-.f64 U* U)) |
(*.f64 (/.f64 (-.f64 U* U) Om) n) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) 1) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) 1) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) Om) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 1 n))) |
(*.f64 (/.f64 1 Om) (/.f64 (-.f64 U* U) (/.f64 1 n))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (-.f64 U* U) (cbrt.f64 (/.f64 Om n)))) |
(*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 (-.f64 U* U) (sqrt.f64 (/.f64 Om n)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) Om) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 1 n))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 (-.f64 U* U)) (sqrt.f64 (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 (-.f64 U* U)) (cbrt.f64 (/.f64 Om n)))) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) 1) n) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (sqrt.f64 n)) (sqrt.f64 n)) |
(*.f64 (/.f64 (-.f64 U* U) 1) (/.f64 n Om)) |
(*.f64 (/.f64 (-.f64 U* U) (neg.f64 Om)) (neg.f64 n)) |
(pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3) |
(pow.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) |
(pow.f64 (/.f64 (/.f64 Om n) (-.f64 U* U)) -1) |
(neg.f64 (/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) n))) |
(sqrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2)) |
(log.f64 (pow.f64 (exp.f64 (/.f64 (-.f64 U* U) Om)) n)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(cbrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(exp.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) 1) |
(*.f64 Om (/.f64 1 (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 Om (*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(*.f64 1 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (neg.f64 (/.f64 Om U)) (*.f64 l (*.f64 l n))) (/.f64 1 (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 Om 1) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(*.f64 (/.f64 Om (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 Om (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 1 (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) 1) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 8 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3))) (+.f64 4 (*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 4 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2))) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 3) |
(pow.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) |
(pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) -1) |
(neg.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(sqrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) |
(log.f64 (exp.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(cbrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) (pow.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3))) |
(expm1.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(exp.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 1)) |
(log1p.f64 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
| Outputs |
|---|
(*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) |
(*.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(fma.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U))) (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (/.f64 (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) Om) n) (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))) |
(fma.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 Om n) (*.f64 (/.f64 l -1) (/.f64 (sqrt.f64 -2) (sqrt.f64 -1))))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (sqrt.f64 -2))) (*.f64 (pow.f64 n 2) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (/.f64 (*.f64 (sqrt.f64 -1) (*.f64 n (*.f64 l (sqrt.f64 -2)))) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))) (+.f64 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1/2 (*.f64 (/.f64 (*.f64 Om (*.f64 l (sqrt.f64 -2))) (*.f64 n (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3)))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))) (fma.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (/.f64 (/.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) Om) n) (pow.f64 (sqrt.f64 -1) 3))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(fma.f64 1/2 (*.f64 (*.f64 (*.f64 (/.f64 Om n) (/.f64 Om n)) (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 (sqrt.f64 -1) 5))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5)))) (fma.f64 (/.f64 (*.f64 (*.f64 (sqrt.f64 -1) n) (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U (-.f64 U* U))) (fma.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 -1)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 (*.f64 -1/2 (*.f64 (/.f64 Om n) (*.f64 (/.f64 l -1) (/.f64 (sqrt.f64 -2) (sqrt.f64 -1))))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))))) |
(/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) |
(/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om)) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om)) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U))))) |
(+.f64 (fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om)) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 l Om) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))) (*.f64 n U)))) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (fma.f64 -1/8 (*.f64 (/.f64 (*.f64 l Om) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)) U)) (/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om))) |
(+.f64 (*.f64 1/2 (*.f64 l (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) (sqrt.f64 -2)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 Om 2) (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3) (sqrt.f64 -2)))) (*.f64 (pow.f64 n 2) (pow.f64 U 2)))) (+.f64 (/.f64 (*.f64 n (*.f64 l (*.f64 (sqrt.f64 -2) U))) Om) (*.f64 -1/8 (/.f64 (*.f64 Om (*.f64 l (*.f64 (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2) (sqrt.f64 -2)))) (*.f64 n U)))))) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (fma.f64 1/16 (/.f64 (*.f64 Om Om) (/.f64 (*.f64 (*.f64 n n) (*.f64 U U)) (*.f64 (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) (sqrt.f64 -2)))) (+.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om) (*.f64 -1/8 (/.f64 (*.f64 (*.f64 l Om) (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))) (*.f64 n U)))))) |
(fma.f64 1/2 (*.f64 l (*.f64 (sqrt.f64 -2) (-.f64 2 (/.f64 n (/.f64 Om U*))))) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 Om Om) (*.f64 U U)) (/.f64 (*.f64 (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) (sqrt.f64 -2)) (*.f64 n n))) (fma.f64 -1/8 (*.f64 (/.f64 (*.f64 l Om) n) (/.f64 (*.f64 (sqrt.f64 -2) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)) U)) (/.f64 (*.f64 (*.f64 n l) (*.f64 (sqrt.f64 -2) U)) Om)))) |
(*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U))))) |
(/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U)))) Om) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))) |
(fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U)))))) |
(fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (/.f64 (neg.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U)))) Om)) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om)))) |
(fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (fma.f64 1/8 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 U (pow.f64 (sqrt.f64 -1) 3))) (*.f64 (*.f64 l Om) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U))))))) |
(-.f64 (fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (*.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (*.f64 l Om) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) U))))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U))))) |
(+.f64 (*.f64 1/2 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 l (-.f64 2 (/.f64 (*.f64 n U*) Om)))) (sqrt.f64 -1))) (+.f64 (*.f64 1/8 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) (*.f64 n (*.f64 (pow.f64 (sqrt.f64 -1) 3) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) (*.f64 l (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (pow.f64 U 2))))) (*.f64 -1 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n (*.f64 (sqrt.f64 -1) (*.f64 l U)))) Om))))) |
(fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (fma.f64 1/8 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n (*.f64 U (pow.f64 (sqrt.f64 -1) 3))) (*.f64 (*.f64 l Om) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)))) (fma.f64 1/16 (/.f64 (sqrt.f64 2) (/.f64 (*.f64 (*.f64 n n) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 U U))) (*.f64 (*.f64 Om Om) (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3))))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U)))))))) |
(fma.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 -1) (*.f64 l (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (-.f64 (fma.f64 1/8 (*.f64 (/.f64 (sqrt.f64 2) n) (*.f64 (/.f64 (*.f64 l Om) (*.f64 -1 (sqrt.f64 -1))) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) U))) (*.f64 (/.f64 1/16 (*.f64 n n)) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 Om Om)) (*.f64 l (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3))) (*.f64 (pow.f64 (sqrt.f64 -1) 5) (*.f64 U U))))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 (*.f64 n (sqrt.f64 -1)) (*.f64 l U)))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 -1 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(neg.f64 (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (neg.f64 (*.f64 l (sqrt.f64 -2)))) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) |
(*.f64 n (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))) |
(fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(fma.f64 n (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 n (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) n) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (*.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om))) Om))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5)))))) (*.f64 (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (*.f64 l (sqrt.f64 -2)))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (fma.f64 1/2 (*.f64 (/.f64 l (/.f64 (*.f64 n n) (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5)))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))))) |
(fma.f64 -1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))) (fma.f64 n (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (/.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) (fma.f64 1/2 (*.f64 (/.f64 l (/.f64 n (sqrt.f64 -2))) (/.f64 (sqrt.f64 (/.f64 (/.f64 U Om) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 5))) n)) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 U (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))))))))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))) |
(neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (neg.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))) |
(-.f64 (*.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 l (sqrt.f64 2))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))))) |
(-.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 l (sqrt.f64 2)) (*.f64 (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (pow.f64 Om 2) l)) (pow.f64 n 2)) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))))) (+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 U (-.f64 U* U)))) (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om l)) n) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (/.f64 (sqrt.f64 2) (/.f64 (*.f64 n n) (*.f64 l (*.f64 Om Om))))) (fma.f64 (*.f64 l (sqrt.f64 2)) (sqrt.f64 (/.f64 U (-.f64 U* U))) (fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))) (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))))) |
(fma.f64 1/2 (*.f64 (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 5))) (*.f64 (/.f64 (sqrt.f64 2) n) (/.f64 (*.f64 l (*.f64 Om Om)) n))) (-.f64 (fma.f64 (sqrt.f64 (/.f64 U (-.f64 U* U))) (*.f64 l (sqrt.f64 2)) (*.f64 (*.f64 1/2 (/.f64 (sqrt.f64 2) (/.f64 n (*.f64 l Om)))) (sqrt.f64 (/.f64 U (pow.f64 (-.f64 U* U) 3))))) (*.f64 (sqrt.f64 (*.f64 U (-.f64 U* U))) (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l)))))) |
(*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) |
(*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2)))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (*.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om))))))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om))))))) (*.f64 l (sqrt.f64 -2)) (*.f64 (*.f64 -1/8 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 U (pow.f64 Om 5))))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*)))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om))))))) (*.f64 (*.f64 -1/8 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 U (pow.f64 Om 5))))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*)))))) |
(+.f64 (*.f64 -1/2 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 3) U) (*.f64 (pow.f64 Om 3) (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*)))) (+.f64 (*.f64 -1/16 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 7) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 5) (pow.f64 Om 7)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 3))))) (+.f64 (*.f64 (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) U)) Om)) (*.f64 l (sqrt.f64 -2))) (*.f64 -1/8 (*.f64 (sqrt.f64 (/.f64 (*.f64 (pow.f64 n 5) U) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)))) (*.f64 l (*.f64 (sqrt.f64 -2) (pow.f64 U* 2)))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 -1/16 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 5)) (/.f64 U (pow.f64 Om 7)))) (*.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 U* 3))) (fma.f64 (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om))))))) (*.f64 l (sqrt.f64 -2)) (*.f64 (*.f64 -1/8 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 U (pow.f64 Om 5))))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*))))))) |
(fma.f64 -1/2 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 3) (pow.f64 Om 3)) (/.f64 U (+.f64 2 (*.f64 n (/.f64 U Om)))))) (*.f64 l (*.f64 (sqrt.f64 -2) U*))) (fma.f64 -1/16 (*.f64 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 7) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 5)) (/.f64 U (pow.f64 Om 7)))) (*.f64 (*.f64 l (sqrt.f64 -2)) (pow.f64 U* 3))) (fma.f64 (*.f64 l (sqrt.f64 -2)) (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 2 (*.f64 n (/.f64 U Om))))))) (*.f64 (*.f64 -1/8 (sqrt.f64 (*.f64 (/.f64 (pow.f64 n 5) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 U (pow.f64 Om 5))))) (*.f64 l (*.f64 (sqrt.f64 -2) (*.f64 U* U*))))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(*.f64 n (neg.f64 (/.f64 U Om))) |
(*.f64 n (/.f64 (neg.f64 U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n U*) Om) |
(/.f64 n (/.f64 Om U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n U*) Om) |
(/.f64 n (/.f64 Om U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n U*) Om) |
(/.f64 n (/.f64 Om U*)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(*.f64 n (neg.f64 (/.f64 U Om))) |
(*.f64 n (/.f64 (neg.f64 U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 -1 (/.f64 (*.f64 n U) Om)) |
(*.f64 n (neg.f64 (/.f64 U Om))) |
(*.f64 n (/.f64 (neg.f64 U) Om)) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 n U) Om)) (/.f64 (*.f64 n U*) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(/.f64 (*.f64 n (-.f64 U* U)) Om) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))))) |
(-.f64 (fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (*.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (fma.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 (pow.f64 n 5) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 4)))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (*.f64 (/.f64 -8 (*.f64 (pow.f64 n 5) (*.f64 l l))) (/.f64 (pow.f64 Om 5) (*.f64 U (pow.f64 (-.f64 U* U) 4))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U (-.f64 U* U)))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U)) |
(*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U))) |
(fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (/.f64 (*.f64 1/4 (-.f64 U* U)) (*.f64 U (*.f64 l l)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 Om (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 2)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/8 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 Om (*.f64 l l))) (/.f64 n U)) (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (fma.f64 1/16 (/.f64 (*.f64 n n) (/.f64 (*.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 3))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 Om (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 2))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 n n) (*.f64 U (*.f64 l l))) (/.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 Om Om))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 Om (*.f64 l l))) (/.f64 n U)))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U)) |
(*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U))) |
(fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (/.f64 (*.f64 1/4 (-.f64 U* U)) (*.f64 U (*.f64 l l)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 Om (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 2)))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/8 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 Om (*.f64 l l))) (/.f64 n U)) (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(+.f64 (*.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (+.f64 (*.f64 1/16 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 (-.f64 U* U) 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (pow.f64 (-.f64 U* U) 2)) (*.f64 Om (*.f64 (pow.f64 l 2) U))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (fma.f64 1/16 (/.f64 (*.f64 n n) (/.f64 (*.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 3))) (*.f64 1/8 (/.f64 n (/.f64 (*.f64 Om (*.f64 U (*.f64 l l))) (pow.f64 (-.f64 U* U) 2))))))) |
(fma.f64 1/4 (/.f64 (-.f64 U* U) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (fma.f64 1/16 (*.f64 (/.f64 (*.f64 n n) (*.f64 U (*.f64 l l))) (/.f64 (pow.f64 (-.f64 U* U) 3) (*.f64 Om Om))) (*.f64 1/8 (*.f64 (/.f64 (pow.f64 (-.f64 U* U) 2) (*.f64 Om (*.f64 l l))) (/.f64 n U)))))) |
(/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) |
(/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) |
(-.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(-.f64 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (/.f64 (/.f64 1 (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (-.f64 (/.f64 (*.f64 n (/.f64 U Om)) (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 l l))) (/.f64 (/.f64 1 (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (fma.f64 (/.f64 n Om) (/.f64 U (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 l l))) (/.f64 -1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(-.f64 (+.f64 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) U)))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U 2)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 4))))) (/.f64 (*.f64 n U) (*.f64 Om (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)))))) (/.f64 1 (*.f64 (pow.f64 l 2) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (-.f64 (fma.f64 -1 (/.f64 (*.f64 (*.f64 n n) (*.f64 U U)) (*.f64 (*.f64 (*.f64 Om Om) (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 4))) (/.f64 (*.f64 n (/.f64 U Om)) (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 l l)))) (/.f64 (/.f64 1 (*.f64 l l)) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2)))) |
(+.f64 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (-.f64 2 (/.f64 n (/.f64 Om U*)))))) (+.f64 (-.f64 (*.f64 (/.f64 n (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3)) (/.f64 (/.f64 U Om) (*.f64 l l))) (*.f64 (/.f64 (*.f64 n n) (*.f64 (*.f64 l l) (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 4))) (/.f64 (*.f64 U U) (*.f64 Om Om)))) (/.f64 -1 (*.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 l l))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) |
(*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l)))) |
(-.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (+.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4)))))) |
(-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5)))) (+.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))))))) |
(-.f64 (-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5))))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))) |
(/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) |
(*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l)))) |
(-.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2)))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (+.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4)))))) |
(-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 3) (-.f64 2 (/.f64 (*.f64 n U*) Om))) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (pow.f64 U 3))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 Om 5) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 3)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (pow.f64 U 5))))) (+.f64 (/.f64 (*.f64 (pow.f64 Om 4) (pow.f64 (-.f64 2 (/.f64 (*.f64 n U*) Om)) 2)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (pow.f64 U 4)))) (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (pow.f64 U 2))))))) |
(fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3)))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5)))) (+.f64 (/.f64 (/.f64 (*.f64 Om Om) (*.f64 n n)) (*.f64 (*.f64 U U) (*.f64 l l))) (*.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))))))) |
(-.f64 (-.f64 (fma.f64 (/.f64 (pow.f64 Om 4) (pow.f64 n 4)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 2) (*.f64 (*.f64 l l) (pow.f64 U 4))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U U)))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) 3) (*.f64 (*.f64 l l) (pow.f64 U 5))))) (*.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (/.f64 (-.f64 2 (/.f64 n (/.f64 Om U*))) (*.f64 (*.f64 l l) (pow.f64 U 3))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (/.f64 (*.f64 n (-.f64 U* U)) Om)) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U)) |
(*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (/.f64 (*.f64 1/2 Om) (*.f64 (*.f64 n (*.f64 l l)) U))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U))))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 1/8 (*.f64 (/.f64 n (*.f64 l l)) (/.f64 (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U))))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 (/.f64 1/8 U) (*.f64 (/.f64 (*.f64 n Om) l) (/.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) l))))) |
(+.f64 (*.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 -1/16 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (*.f64 (pow.f64 l 2) U))) (+.f64 (*.f64 1/2 (/.f64 Om (*.f64 n (*.f64 (pow.f64 l 2) U)))) (*.f64 1/8 (/.f64 (*.f64 n (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2))) (*.f64 (pow.f64 l 2) U)))))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (fma.f64 -1/16 (*.f64 (/.f64 (*.f64 n n) (*.f64 l l)) (/.f64 (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)) U)) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 1/8 (*.f64 (/.f64 n (*.f64 l l)) (/.f64 (*.f64 Om (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)))))) |
(fma.f64 -1/4 (/.f64 (*.f64 Om (-.f64 (/.f64 U Om) (/.f64 U* Om))) (*.f64 U (*.f64 l l))) (fma.f64 -1/16 (*.f64 (/.f64 (*.f64 (*.f64 n n) Om) U) (/.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3) (*.f64 l l))) (fma.f64 1/2 (/.f64 Om (*.f64 (*.f64 n (*.f64 l l)) U)) (*.f64 (/.f64 1/8 U) (*.f64 (/.f64 (*.f64 n Om) l) (/.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) l)))))) |
(/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om)))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U))))) |
(fma.f64 -2 (/.f64 (/.f64 Om (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))))) |
(fma.f64 -2 (/.f64 (/.f64 Om (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)) (fma.f64 4 (/.f64 (/.f64 Om (pow.f64 n 4)) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om)))))) |
(+.f64 (*.f64 -2 (/.f64 Om (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2) U))))) (+.f64 (*.f64 4 (/.f64 Om (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3)))))) (+.f64 (/.f64 Om (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) U)))) (*.f64 -8 (/.f64 Om (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4) U)))))))) |
(fma.f64 -2 (/.f64 (/.f64 Om (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)) (+.f64 (fma.f64 4 (/.f64 (/.f64 Om (pow.f64 n 4)) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om))))) (/.f64 (*.f64 -8 Om) (*.f64 (*.f64 (pow.f64 n 5) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4)))))) |
(fma.f64 -2 (/.f64 (/.f64 Om (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 2)) U)) (fma.f64 4 (/.f64 (/.f64 Om (pow.f64 n 4)) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 3))) (fma.f64 -8 (/.f64 Om (*.f64 (*.f64 (pow.f64 n 5) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 (/.f64 U Om) (/.f64 U* Om)) 4)))) (/.f64 (/.f64 Om (*.f64 n n)) (*.f64 (*.f64 U (*.f64 l l)) (-.f64 (/.f64 U Om) (/.f64 U* Om))))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))) |
(+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))) |
(fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))) |
(fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U))))))) |
(-.f64 (fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (*.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U (-.f64 U* U))))) |
(+.f64 (*.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 3) U))))) (+.f64 (*.f64 -2 (/.f64 (pow.f64 Om 3) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 2) U))))) (+.f64 (*.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 (pow.f64 (-.f64 U* U) 4) U))))) (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (-.f64 U* U) U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (fma.f64 -8 (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 (pow.f64 n 5) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 4)))) (neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U (-.f64 U* U)))))))) |
(fma.f64 -4 (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 (pow.f64 n 4) (*.f64 l l)) (*.f64 U (pow.f64 (-.f64 U* U) 3)))) (-.f64 (fma.f64 -2 (/.f64 (/.f64 (pow.f64 Om 3) (pow.f64 n 3)) (*.f64 (*.f64 (*.f64 l l) (pow.f64 (-.f64 U* U) 2)) U)) (*.f64 (/.f64 -8 (*.f64 (pow.f64 n 5) (*.f64 l l))) (/.f64 (pow.f64 Om 5) (*.f64 U (pow.f64 (-.f64 U* U) 4))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U (-.f64 U* U)))))) |
(/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) |
(/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l)))) |
(+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U)))) |
(+.f64 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l)))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2)))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 Om (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))))) |
(+.f64 (+.f64 (*.f64 (/.f64 n (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 (*.f64 U* U*) (*.f64 Om (*.f64 U (*.f64 l l))))) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l))))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2)))) |
(+.f64 (fma.f64 (/.f64 n (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3)) (/.f64 (*.f64 U* U*) (*.f64 Om (*.f64 U (*.f64 l l)))) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l))))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2)))) |
(+.f64 (/.f64 (*.f64 n (pow.f64 U* 2)) (*.f64 Om (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 Om (*.f64 n (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (*.f64 (pow.f64 l 2) U)))) (+.f64 (/.f64 U* (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (*.f64 (pow.f64 l 2) U))) (/.f64 (*.f64 (pow.f64 n 2) (pow.f64 U* 3)) (*.f64 (pow.f64 Om 2) (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 4) (*.f64 (pow.f64 l 2) U))))))) |
(+.f64 (+.f64 (/.f64 (/.f64 (*.f64 n (*.f64 U* U*)) Om) (*.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (*.f64 U (*.f64 l l)))) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l))))) (+.f64 (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2))) (*.f64 (/.f64 (*.f64 n n) (*.f64 Om Om)) (/.f64 (pow.f64 U* 3) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 4)))))) |
(+.f64 (fma.f64 (/.f64 n Om) (*.f64 (/.f64 U* (*.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (*.f64 l l))) (/.f64 U* U)) (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 U (*.f64 l l))))) (fma.f64 (*.f64 (/.f64 n Om) (/.f64 n Om)) (/.f64 (pow.f64 U* 3) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 4))) (/.f64 U* (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2))))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U)))) |
(/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(*.f64 -1 (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3))))) |
(-.f64 (/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3)))) (neg.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3)))))) |
(-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*)))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U* U)))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3)))) (*.f64 -1 (+.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3))) (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*)))))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4)))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U* U)))) |
(*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) |
(neg.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U)))) |
(/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2))))))) |
(*.f64 -1 (+.f64 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3))))) |
(-.f64 (/.f64 (neg.f64 (*.f64 Om Om)) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*))))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3)))) (neg.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3)))))) |
(-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*)))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U* U)))) |
(+.f64 (*.f64 -1 (/.f64 (pow.f64 Om 2) (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 2) (pow.f64 Om 4)) (*.f64 (pow.f64 n 4) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 3)))))) (+.f64 (*.f64 -1 (/.f64 (*.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) (pow.f64 Om 3)) (*.f64 (pow.f64 n 3) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 2)))))) (*.f64 -1 (/.f64 (*.f64 (pow.f64 (-.f64 2 (*.f64 -1 (/.f64 (*.f64 n U) Om))) 3) (pow.f64 Om 5)) (*.f64 (pow.f64 n 5) (*.f64 (pow.f64 l 2) (*.f64 U (pow.f64 U* 4))))))))) |
(fma.f64 -1 (/.f64 (*.f64 Om Om) (*.f64 (*.f64 (*.f64 n n) (*.f64 l l)) (*.f64 U* U))) (fma.f64 -1 (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3)))) (*.f64 -1 (+.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (/.f64 (*.f64 (*.f64 (pow.f64 n 3) (*.f64 l l)) (*.f64 U (*.f64 U* U*))) (pow.f64 Om 3))) (*.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (pow.f64 n 5)) (/.f64 (pow.f64 Om 5) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4))))))))) |
(-.f64 (-.f64 (neg.f64 (fma.f64 (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 2) (pow.f64 n 4)) (/.f64 (pow.f64 Om 4) (*.f64 (*.f64 U (*.f64 l l)) (pow.f64 U* 3))) (*.f64 (/.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) (*.f64 (pow.f64 n 3) (*.f64 l l))) (/.f64 (pow.f64 Om 3) (*.f64 U (*.f64 U* U*)))))) (*.f64 (/.f64 (pow.f64 Om 5) (pow.f64 n 5)) (/.f64 (pow.f64 (+.f64 2 (*.f64 n (/.f64 U Om))) 3) (*.f64 (*.f64 l l) (*.f64 U (pow.f64 U* 4)))))) (*.f64 (/.f64 Om (*.f64 (*.f64 n n) (*.f64 l l))) (/.f64 Om (*.f64 U* U)))) |
(-.f64 (exp.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) 1) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 1 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) |
(*.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(*.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) |
(*.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4)) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))))) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))))) |
(*.f64 (sqrt.f64 -2) (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) 1/2)) |
(*.f64 (sqrt.f64 -2) (sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))))) |
(*.f64 (sqrt.f64 -2) (/.f64 1 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (sqrt.f64 -2))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(*.f64 (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))))) |
(*.f64 (pow.f64 1 1/2) (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (pow.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 2) 1/2) (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) |
(*.f64 (sqrt.f64 (pow.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) 2)) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))))) |
(*.f64 (fabs.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))))) (sqrt.f64 (cbrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))))) |
(*.f64 (pow.f64 (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))) 1/2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(/.f64 1 (sqrt.f64 (*.f64 -1/2 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 -2))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (sqrt.f64 -2))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (neg.f64 Om) (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (/.f64 (neg.f64 Om) (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 Om (*.f64 (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (*.f64 l U) (*.f64 n l)))))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 1 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (sqrt.f64 -2))) |
(/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))))) |
(/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(/.f64 (neg.f64 (sqrt.f64 -2)) (neg.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(*.f64 1 (/.f64 (sqrt.f64 -2) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))))) |
(pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/2) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(pow.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(pow.f64 (cbrt.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 3) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2) 1/3) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))) 3/2)) |
(pow.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 1/4) 2) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(fabs.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(log.f64 (exp.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(log.f64 (+.f64 1 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))) 3/2)) |
(cbrt.f64 (pow.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l)))) 3/2)) |
(expm1.f64 (log1p.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(exp.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))) 1/2)) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n))))))) 1)) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(log1p.f64 (expm1.f64 (sqrt.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (*.f64 (/.f64 -2 Om) (*.f64 U (*.f64 l (*.f64 l n)))))))) |
(sqrt.f64 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) 1) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 Om (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 1 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (cbrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (sqrt.f64 Om) (*.f64 (sqrt.f64 Om) (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (neg.f64 Om) (/.f64 1 (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) |
(/.f64 (*.f64 (neg.f64 Om) 1) (neg.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) |
(/.f64 (/.f64 (neg.f64 Om) U) (*.f64 (*.f64 l l) (neg.f64 n))) |
(*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) Om) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 Om U) (/.f64 1 (*.f64 l (*.f64 l n)))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 1 U) (/.f64 Om (*.f64 l (*.f64 l n)))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 1 (*.f64 l (*.f64 l n))) (/.f64 Om U)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 Om (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))) 2)) (/.f64 Om (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))))) |
(/.f64 (/.f64 Om (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) (pow.f64 (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))) 2)) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 Om (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 1 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) (/.f64 Om (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))))) |
(/.f64 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) |
(*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) U) (/.f64 (cbrt.f64 Om) (*.f64 l (*.f64 l n)))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 l (*.f64 l n))) (/.f64 (cbrt.f64 Om) U)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) 1) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 (*.f64 (pow.f64 (cbrt.f64 Om) 2) (cbrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))))) (pow.f64 (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))) 2)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) (/.f64 (cbrt.f64 Om) (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 U l)) (/.f64 (cbrt.f64 Om) (*.f64 l n))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (sqrt.f64 Om) U) (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n)))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 l (*.f64 l n))) (/.f64 (sqrt.f64 Om) U)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (sqrt.f64 Om) 1) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(*.f64 (/.f64 (sqrt.f64 Om) (pow.f64 (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))) 2)) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 (*.f64 (sqrt.f64 Om) (/.f64 (sqrt.f64 Om) (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))))) (pow.f64 (cbrt.f64 (*.f64 (*.f64 l U) (*.f64 n l))) 2)) |
(*.f64 (/.f64 (sqrt.f64 Om) (*.f64 U l)) (/.f64 (sqrt.f64 Om) (*.f64 l n))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 1) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 3) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(pow.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) 1/3) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(pow.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(pow.f64 (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n)))) -1) |
(/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) |
(neg.f64 (/.f64 Om (*.f64 U (neg.f64 (*.f64 l (*.f64 l n)))))) |
(/.f64 (*.f64 (neg.f64 Om) 1) (neg.f64 (*.f64 (*.f64 l U) (*.f64 n l)))) |
(/.f64 (/.f64 (neg.f64 Om) U) (*.f64 (*.f64 l l) (neg.f64 n))) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 2)) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) 2)) |
(fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) |
(log.f64 (exp.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(cbrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(cbrt.f64 (/.f64 (pow.f64 Om 3) (pow.f64 (*.f64 U (*.f64 l (*.f64 l n))) 3))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(expm1.f64 (log1p.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(exp.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(exp.f64 (*.f64 (log.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1)) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(log1p.f64 (expm1.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))))) |
(/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) |
(+.f64 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 1 (*.f64 U* (/.f64 n Om)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 (*.f64 U* (/.f64 n Om))) (cbrt.f64 (*.f64 U* (/.f64 n Om)))) (cbrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (sqrt.f64 (*.f64 U* (/.f64 n Om))) (sqrt.f64 (*.f64 U* (/.f64 n Om))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 U* Om) n) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 U* Om) n) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 U* Om) n) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 U* Om) n) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 U* Om) n (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 U* Om) n) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* Om) n (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* Om) n) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* Om) n (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 U* Om) n (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 U* Om) n (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (sqrt.f64 U) Om) (*.f64 (sqrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 1 Om) (*.f64 n U*)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 1 Om) (/.f64 U* (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 1 Om) (*.f64 n U*) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) Om) (*.f64 (sqrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 U* (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n)))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 U* (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (/.f64 (cbrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (/.f64 (cbrt.f64 U*) 1) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) Om) (*.f64 (cbrt.f64 U*) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (sqrt.f64 U) Om) (*.f64 (sqrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) 1) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (pow.f64 (cbrt.f64 U*) 2) (/.f64 (cbrt.f64 U*) (/.f64 Om n)) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (cbrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (pow.f64 (cbrt.f64 U*) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (cbrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (sqrt.f64 U) Om) (*.f64 (sqrt.f64 U) (neg.f64 n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) Om) (/.f64 (sqrt.f64 U*) (/.f64 1 n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (sqrt.f64 U*) Om) (*.f64 (sqrt.f64 U*) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) 1) (/.f64 (sqrt.f64 U*) (/.f64 Om n)) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (sqrt.f64 U*) (*.f64 (/.f64 (sqrt.f64 U*) Om) n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 (neg.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (sqrt.f64 U*) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 U*) (cbrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n)))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U*) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2)))) (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (/.f64 U (/.f64 Om n))) (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (-.f64 (/.f64 n (/.f64 Om U*)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om)))) |
(fma.f64 n (/.f64 (-.f64 U* U) Om) (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* 1) (/.f64 n Om) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om)))) |
(+.f64 (fma.f64 U* (/.f64 n Om) (*.f64 n (/.f64 U (neg.f64 Om)))) (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) U))) (fma.f64 (neg.f64 (/.f64 n Om)) U (*.f64 (/.f64 n Om) U))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (*.f64 U (/.f64 n Om)) 1))) (fma.f64 (neg.f64 (*.f64 U (/.f64 n Om))) 1 (*.f64 (*.f64 U (/.f64 n Om)) 1))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) (fma.f64 (neg.f64 (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om)))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 (cbrt.f64 (*.f64 U (/.f64 n Om))) (cbrt.f64 (*.f64 U (/.f64 n Om))))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (sqrt.f64 (*.f64 U (/.f64 n Om)))) (sqrt.f64 (*.f64 U (/.f64 n Om))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (neg.f64 (sqrt.f64 (*.f64 n (/.f64 U Om)))) (sqrt.f64 (*.f64 n (/.f64 U Om))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 U (/.f64 n Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 U (/.f64 n Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (sqrt.f64 (/.f64 Om n))) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 n (/.f64 U Om)))) (fma.f64 (neg.f64 n) (/.f64 U Om) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) (fma.f64 (neg.f64 (/.f64 U (/.f64 1 n))) (/.f64 1 Om) (*.f64 (/.f64 U (/.f64 1 n)) (/.f64 1 Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 U (cbrt.f64 (/.f64 Om n)))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (neg.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (/.f64 (/.f64 U (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 U (sqrt.f64 (/.f64 Om n)))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n))))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (neg.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 1 (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 -1 (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (/.f64 (/.f64 U (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om) (*.f64 (*.f64 (/.f64 (cbrt.f64 U) 1) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 1 n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) Om) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 (*.f64 (cbrt.f64 U) n) (/.f64 (pow.f64 (cbrt.f64 U) 2) Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (/.f64 (pow.f64 (cbrt.f64 U) 2) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 (/.f64 (cbrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) (fma.f64 (neg.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n)))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (sqrt.f64 (/.f64 Om n))) (/.f64 (pow.f64 (cbrt.f64 U) 2) (sqrt.f64 (/.f64 Om n)))))) |
(+.f64 (fma.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n)))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (/.f64 (*.f64 (/.f64 (cbrt.f64 U) (sqrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 U) 2)) (sqrt.f64 (/.f64 Om n))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n))) (/.f64 (sqrt.f64 U) Om) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 1 n)) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (neg.f64 (*.f64 (sqrt.f64 U) n)) (/.f64 (sqrt.f64 U) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (*.f64 (sqrt.f64 U) n) (neg.f64 (/.f64 (sqrt.f64 U) Om))))) |
(+.f64 (fma.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (neg.f64 (sqrt.f64 U)) Om) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 (*.f64 (sqrt.f64 U) n) (/.f64 (sqrt.f64 U) Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n))) (/.f64 (sqrt.f64 U) 1) (*.f64 (/.f64 (sqrt.f64 U) (/.f64 Om n)) (/.f64 (sqrt.f64 U) 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (cbrt.f64 U)) (/.f64 Om n)) (pow.f64 (cbrt.f64 U) 2) (*.f64 (pow.f64 (cbrt.f64 U) 2) (/.f64 (cbrt.f64 U) (/.f64 Om n)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (cbrt.f64 U) (/.f64 Om n)) (neg.f64 (pow.f64 (cbrt.f64 U) 2))))) |
(+.f64 (fma.f64 -1 (/.f64 U (/.f64 Om n)) (/.f64 U (/.f64 Om n))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (/.f64 (neg.f64 U) (/.f64 Om n)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) (fma.f64 (neg.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n)))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 (sqrt.f64 U)) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (neg.f64 (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))))) |
(+.f64 (fma.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (neg.f64 (sqrt.f64 U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 (/.f64 (sqrt.f64 U) (cbrt.f64 (/.f64 Om n))) (/.f64 (sqrt.f64 U) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2))))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (/.f64 n Om) (/.f64 U 1)))) (fma.f64 (neg.f64 (/.f64 n Om)) (/.f64 U 1) (*.f64 (/.f64 n Om) (/.f64 U 1)))) |
(+.f64 (fma.f64 (/.f64 (neg.f64 n) Om) U (*.f64 n (/.f64 U Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (neg.f64 (/.f64 U Om))))) |
(+.f64 (fma.f64 n (/.f64 (neg.f64 U) Om) (*.f64 n (/.f64 U Om))) (-.f64 (*.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n)) (*.f64 n (/.f64 U Om)))) |
(+.f64 (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (neg.f64 (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) (fma.f64 (neg.f64 (neg.f64 n)) (/.f64 U (neg.f64 Om)) (*.f64 (neg.f64 n) (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (/.f64 (*.f64 (neg.f64 n) U) (neg.f64 Om))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(+.f64 (fma.f64 n (/.f64 U (neg.f64 Om)) (*.f64 n (/.f64 (neg.f64 U) (neg.f64 Om)))) (fma.f64 (/.f64 U* (neg.f64 Om)) (neg.f64 n) (*.f64 n (/.f64 U (neg.f64 Om))))) |
(-.f64 (*.f64 U* (/.f64 n Om)) (*.f64 U (/.f64 n Om))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 n (/.f64 (-.f64 U* U) Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (-.f64 U* U) (/.f64 n Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 1 (*.f64 n (/.f64 (-.f64 U* U) Om))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (*.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 n Om))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (sqrt.f64 (-.f64 U* U)) (*.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 n Om))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (neg.f64 (-.f64 U* U)) (/.f64 1 (/.f64 (neg.f64 Om) n))) |
(/.f64 (neg.f64 (-.f64 U* U)) (/.f64 (neg.f64 Om) n)) |
(*.f64 (/.f64 n Om) (-.f64 U* U)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (/.f64 (-.f64 U* U) Om) n) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) 1) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(/.f64 (-.f64 U* U) (/.f64 Om n)) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) 1) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 Om n))) |
(/.f64 (-.f64 U* U) (/.f64 Om n)) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) Om) (/.f64 (sqrt.f64 (-.f64 U* U)) (/.f64 1 n))) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) Om) (*.f64 (sqrt.f64 (-.f64 U* U)) n)) |
(*.f64 (/.f64 1 Om) (/.f64 (-.f64 U* U) (/.f64 1 n))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (-.f64 U* U) (cbrt.f64 (/.f64 Om n)))) |
(/.f64 (*.f64 1 (/.f64 (-.f64 U* U) (cbrt.f64 (/.f64 Om n)))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) |
(/.f64 (/.f64 (-.f64 U* U) (cbrt.f64 (/.f64 Om n))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) |
(*.f64 (/.f64 1 (sqrt.f64 (/.f64 Om n))) (/.f64 (-.f64 U* U) (sqrt.f64 (/.f64 Om n)))) |
(/.f64 (/.f64 (-.f64 U* U) (sqrt.f64 (/.f64 Om n))) (sqrt.f64 (/.f64 Om n))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) Om) (/.f64 (cbrt.f64 (-.f64 U* U)) (/.f64 1 n))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) Om) (*.f64 (cbrt.f64 (-.f64 U* U)) n)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 (*.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (cbrt.f64 (/.f64 n (/.f64 Om (-.f64 U* U))))) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (-.f64 U* U)) 2) (sqrt.f64 (/.f64 Om n))) (/.f64 (cbrt.f64 (-.f64 U* U)) (sqrt.f64 (/.f64 Om n)))) |
(*.f64 (/.f64 (sqrt.f64 (-.f64 U* U)) (pow.f64 (cbrt.f64 (/.f64 Om n)) 2)) (/.f64 (sqrt.f64 (-.f64 U* U)) (cbrt.f64 (/.f64 Om n)))) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) 1) n) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (-.f64 U* U) Om) (sqrt.f64 n)) (sqrt.f64 n)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (/.f64 (-.f64 U* U) 1) (/.f64 n Om)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(*.f64 (/.f64 (-.f64 U* U) (neg.f64 Om)) (neg.f64 n)) |
(*.f64 (neg.f64 (-.f64 U* U)) (/.f64 1 (/.f64 (neg.f64 Om) n))) |
(/.f64 (neg.f64 (-.f64 U* U)) (/.f64 (neg.f64 Om) n)) |
(pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 1) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(pow.f64 (cbrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(pow.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3) 1/3) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(pow.f64 (sqrt.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 2) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(pow.f64 (/.f64 (/.f64 Om n) (-.f64 U* U)) -1) |
(/.f64 1 (/.f64 Om (*.f64 n (-.f64 U* U)))) |
(neg.f64 (/.f64 (-.f64 U* U) (/.f64 (neg.f64 Om) n))) |
(*.f64 (neg.f64 (-.f64 U* U)) (/.f64 1 (/.f64 (neg.f64 Om) n))) |
(/.f64 (neg.f64 (-.f64 U* U)) (/.f64 (neg.f64 Om) n)) |
(sqrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2)) |
(sqrt.f64 (pow.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) 2)) |
(fabs.f64 (/.f64 n (/.f64 Om (-.f64 U* U)))) |
(log.f64 (pow.f64 (exp.f64 (/.f64 (-.f64 U* U) Om)) n)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(cbrt.f64 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(expm1.f64 (log1p.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(exp.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (/.f64 (-.f64 U* U) Om))) 1)) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(log1p.f64 (expm1.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 n (/.f64 Om (-.f64 U* U))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) 1) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 Om (/.f64 1 (*.f64 (*.f64 U (*.f64 l (*.f64 l n))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 Om (*.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 1 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2)) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (*.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (neg.f64 (/.f64 Om U)) (*.f64 l (*.f64 l n))) (/.f64 1 (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 (*.f64 (/.f64 (/.f64 (neg.f64 Om) U) (*.f64 l (*.f64 n l))) 1) (neg.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 (neg.f64 Om) (*.f64 (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (*.f64 l U) (*.f64 n l)))) |
(*.f64 (/.f64 1 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 Om 1) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 Om) 2) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (cbrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (sqrt.f64 Om) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) (/.f64 (sqrt.f64 Om) (*.f64 U (*.f64 l (*.f64 l n))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 Om (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 Om (pow.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) (/.f64 1 (*.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (/.f64 Om (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 1 (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 Om (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (/.f64 1 (*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 1 (pow.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) (/.f64 Om (*.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(/.f64 (/.f64 Om (*.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l)))) (pow.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) |
(*.f64 (/.f64 1 (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 1 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(/.f64 (/.f64 Om (*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (*.f64 (*.f64 l U) (*.f64 n l)))) (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) 1) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) 2) (pow.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 2) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (sqrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (pow.f64 (cbrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) 2) (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) (/.f64 (cbrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) 1) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (pow.f64 (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n))))) (cbrt.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 (sqrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (pow.f64 (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) 2)) (/.f64 (sqrt.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (cbrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 8 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 3))) (+.f64 4 (*.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(*.f64 (/.f64 Om (*.f64 (-.f64 8 (pow.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) 3)) (*.f64 (*.f64 l U) (*.f64 n l)))) (+.f64 4 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (+.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(*.f64 (/.f64 Om (*.f64 (-.f64 8 (pow.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) 3)) (*.f64 (*.f64 l U) (*.f64 n l)))) (fma.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) (fma.f64 (-.f64 U* U) (/.f64 n Om) 2) 4)) |
(*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 4 (pow.f64 (*.f64 n (/.f64 (-.f64 U* U) Om)) 2))) (+.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) |
(/.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (+.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (-.f64 4 (pow.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) 2))) |
(/.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (fma.f64 (-.f64 U* U) (/.f64 n Om) 2)) (-.f64 4 (pow.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) 2))) |
(pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 1) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(pow.f64 (cbrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 3) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(pow.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3) 1/3) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(pow.f64 (sqrt.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 2) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(pow.f64 (*.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) (/.f64 U (/.f64 Om (*.f64 l (*.f64 l n))))) -1) |
(/.f64 1 (*.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l))))) |
(neg.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (neg.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 (*.f64 (/.f64 (/.f64 (neg.f64 Om) U) (*.f64 l (*.f64 n l))) 1) (neg.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))) |
(/.f64 (neg.f64 Om) (*.f64 (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U)))) (*.f64 (*.f64 l U) (*.f64 n l)))) |
(sqrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 2)) |
(sqrt.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) 2)) |
(fabs.f64 (/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U)))))))) |
(log.f64 (exp.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(cbrt.f64 (pow.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) 3)) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(cbrt.f64 (/.f64 (pow.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) 3) (pow.f64 (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))) 3))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(expm1.f64 (log1p.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(exp.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om))))) 1)) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
(log1p.f64 (expm1.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))))) |
(/.f64 Om (*.f64 U (*.f64 (*.f64 l (*.f64 n l)) (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))))) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 99.7% | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 99.3% | (/.f64 (sqrt.f64 2) Om) | |
| ✓ | 90.0% | (*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
| 80.9% | (sqrt.f64 (*.f64 U U*)) |
Compiled 61 to 30 computations (50.8% saved)
24 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 2.0ms | Om | @ | 0 | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 1.0ms | U | @ | -inf | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 1.0ms | U* | @ | -inf | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 1.0ms | U | @ | 0 | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 1.0ms | U* | @ | 0 | (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| 1× | batch-egg-rewrite |
| 1822× | log-prod |
| 712× | pow-exp |
| 590× | expm1-udef |
| 588× | log1p-udef |
| 512× | log-pow |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 17 | 70 |
| 1 | 353 | 58 |
| 2 | 4522 | 58 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)) |
| Outputs |
|---|
(((+.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((-.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((neg.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) (pow.f64 (*.f64 n l) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f))) |
(((+.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((-.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 Om (sqrt.f64 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (-.f64 0 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) (+.f64 0 (fma.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)) (*.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (-.f64 0 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (sqrt.f64 2)) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) 1) (/.f64 Om (sqrt.f64 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 -1 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (sqrt.f64 (*.f64 U U*))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) 1) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (sqrt.f64 Om)) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((pow.f64 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((sqrt.f64 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 U U*) 3/2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f)) ((log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om))) #f))) |
| 1× | egg-herbie |
| 876× | associate-/l* |
| 864× | fma-def |
| 720× | distribute-rgt-in |
| 714× | associate-/r* |
| 710× | distribute-lft-in |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 185 | 4179 |
| 1 | 431 | 4105 |
| 2 | 1599 | 4009 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(+.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(-.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3) 1/3) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 2) |
(neg.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) (pow.f64 (*.f64 n l) 3))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 2)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(+.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(-.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) |
(/.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 Om (sqrt.f64 2))) |
(/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) (neg.f64 Om)) |
(/.f64 (-.f64 0 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) (+.f64 0 (fma.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)) (*.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(/.f64 (-.f64 0 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (sqrt.f64 2)) Om) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) 1) (/.f64 Om (sqrt.f64 2))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(/.f64 (*.f64 -1 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (sqrt.f64 (*.f64 U U*))) (neg.f64 Om)) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) 1) Om) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 1) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 3) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 2) |
(pow.f64 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2))) -1) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(sqrt.f64 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 U U*) 3/2))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1)) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1) 1)) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1/3)) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
| Outputs |
|---|
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (sqrt.f64 (*.f64 U* U)) (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n (neg.f64 l)))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(+.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))))) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2))))))))) (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2))))))))) |
(*.f64 3 (log.f64 (cbrt.f64 (pow.f64 (exp.f64 n) (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2)))))))) |
(+.f64 (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (sqrt.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(-.f64 0 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(*.f64 (neg.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 3) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3) 1/3) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(pow.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 2) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(neg.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(*.f64 (neg.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))))) |
(*.f64 (neg.f64 n) (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 n l) 3) (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) (pow.f64 (*.f64 n l) 3))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (*.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) 1) 1)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 3)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 1/3)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) 2)) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(+.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(+.f64 (log.f64 (*.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))))) |
(+.f64 (*.f64 2 (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))))) (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))))) |
(*.f64 3 (log.f64 (cbrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))))) |
(+.f64 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(*.f64 2 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))))) |
(*.f64 2 (log.f64 (sqrt.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))))) |
(-.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) (neg.f64 Om)) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (/.f64 Om (sqrt.f64 2))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (sqrt.f64 2) (/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) (neg.f64 Om)) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) (neg.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (-.f64 0 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) (+.f64 0 (fma.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)) (*.f64 0 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(/.f64 (neg.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) 3)) (fma.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)) 0)) |
(/.f64 (neg.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) 3)) (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) |
(*.f64 (/.f64 (neg.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) 3)) U) (/.f64 Om (*.f64 U* (/.f64 2 Om)))) |
(/.f64 (-.f64 0 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(*.f64 Om (/.f64 (/.f64 (neg.f64 (*.f64 U* (*.f64 U 2))) (*.f64 Om Om)) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 Om (/.f64 (*.f64 U (*.f64 U* (/.f64 -2 (*.f64 Om Om)))) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (sqrt.f64 2)) Om) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (sqrt.f64 2) (/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) 1) (/.f64 Om (sqrt.f64 2))) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (sqrt.f64 2) (/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(/.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(/.f64 (*.f64 -1 (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) (neg.f64 Om)) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 (*.f64 U U*))) (neg.f64 (sqrt.f64 2))) (neg.f64 Om)) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) (/.f64 Om (sqrt.f64 2))) |
(*.f64 (sqrt.f64 2) (/.f64 (neg.f64 (sqrt.f64 (*.f64 U* U))) Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(/.f64 (*.f64 (neg.f64 (sqrt.f64 2)) (sqrt.f64 (*.f64 U U*))) (neg.f64 Om)) |
(*.f64 (/.f64 (sqrt.f64 2) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 U* U)) Om)) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) 1) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (pow.f64 (cbrt.f64 Om) 2)) (cbrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(/.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) (sqrt.f64 Om)) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 1) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 3) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3) 1/3) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 2) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(pow.f64 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2))) -1) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) (neg.f64 Om)) |
(sqrt.f64 (*.f64 (*.f64 U U*) (/.f64 2 (*.f64 Om Om)))) |
(sqrt.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) |
(sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(log.f64 (/.f64 1 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))))) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)) |
(neg.f64 (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) (neg.f64 Om)) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om) 3)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U U*) 3/2) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U* U) 3/2) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(cbrt.f64 (*.f64 (pow.f64 (/.f64 (sqrt.f64 2) Om) 3) (pow.f64 (*.f64 U U*) 3/2))) |
(cbrt.f64 (*.f64 (pow.f64 (*.f64 U* U) 3/2) (pow.f64 (/.f64 (sqrt.f64 2) Om) 3))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (*.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om)) 1) 1)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (*.f64 (log.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 3)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (*.f64 (*.f64 3 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 1/3)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(exp.f64 (*.f64 (log.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) 2)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om) |
(/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om) |
Found 4 expressions with local accuracy:
| New | Accuracy | Program |
|---|---|---|
| ✓ | 90.9% | (*.f64 n (*.f64 l (*.f64 l U*))) |
| ✓ | 87.1% | (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) |
| ✓ | 79.6% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| ✓ | 48.0% | (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
Compiled 140 to 57 computations (59.3% saved)
48 calls:
| Time | Variable | Point | Expression | |
|---|---|---|---|---|
| 90.0ms | n | @ | 0 | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 53.0ms | U* | @ | 0 | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 38.0ms | U* | @ | -inf | (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
| 14.0ms | Om | @ | 0 | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 13.0ms | n | @ | -inf | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 1× | batch-egg-rewrite |
| 750× | expm1-udef |
| 746× | log1p-udef |
| 652× | log-pow |
| 440× | add-sqr-sqrt |
| 438× | associate-*r* |
Useful iterations: 1 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 22 | 140 |
| 1 | 475 | 134 |
| 2 | 5853 | 134 |
| 1× | node limit |
| Inputs |
|---|
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
| Outputs |
|---|
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 n (*.f64 l (*.f64 l U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 l (*.f64 (*.f64 l U*) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 l U*) (*.f64 n l)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 l (*.f64 l U*)) n) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 1 (*.f64 n (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (cbrt.f64 n) 2) (*.f64 (cbrt.f64 n) (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2) (*.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 l l) (*.f64 U* n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 n) (*.f64 (sqrt.f64 n) (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 l (sqrt.f64 U*)) (*.f64 (*.f64 l (sqrt.f64 U*)) n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n l) (*.f64 l U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 1 1/3) (*.f64 n (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (*.f64 l U*)) l) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (*.f64 l l)) U*) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (*.f64 l (sqrt.f64 U*))) (*.f64 l (sqrt.f64 U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (sqrt.f64 n)) (sqrt.f64 n)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n l) l) U*) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n l) U*) l) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n l) 1) (*.f64 l U*)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n l) (cbrt.f64 (pow.f64 (*.f64 l U*) 2))) (cbrt.f64 (*.f64 l U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 l U*))) (sqrt.f64 (*.f64 l U*))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 1 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (sqrt.f64 (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (pow.f64 Om -2) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 1 1/2) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) 1/2) (pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 (sqrt.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) (sqrt.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)))) (neg.f64 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((fabs.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 2 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 2 (/.f64 1 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 2 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 2 (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 Om -2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 1 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) (/.f64 2 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) (/.f64 1 Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 1) (/.f64 2 (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 1 Om) (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 1 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (cbrt.f64 (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) 1) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 n 2) 1) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 Om Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (/.f64 (*.f64 n 2) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 (cbrt.f64 Om) 2))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)) 1/2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) -1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (*.f64 Om (neg.f64 Om)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((sqrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) 3) (pow.f64 (*.f64 Om Om) 3))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f))) |
(((-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 6) 1/6) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((pow.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) 2) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f)) ((log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) #(struct:rr-input (#<rule log1p-expm1-u> #<rule expm1-log1p-u> #<rule pow1> #<rule add-exp-log> #<rule add-log-exp> #<rule add-cube-cbrt> #<rule add-cbrt-cube> #<rule add-sqr-sqrt> #<rule *-un-lft-identity> #<rule not-true> #<rule not-false> #<rule not-not> #<rule not-and> #<rule not-or> #<rule and-true-l> #<rule and-true-r> #<rule and-false-l> #<rule and-false-r> #<rule and-same> #<rule or-true-l> #<rule or-true-r> #<rule or-false-l> #<rule or-false-r> #<rule or-same> #<rule erf-odd> #<rule erf-erfc> #<rule erfc-erf> #<rule if-true> #<rule if-false> #<rule if-same> #<rule if-not> #<rule if-if-or> #<rule if-if-or-not> #<rule if-if-and> #<rule if-if-and-not> #<rule lt-same> #<rule gt-same> #<rule lte-same> #<rule gte-same> #<rule not-lt> #<rule not-gt> #<rule not-lte> #<rule not-gte> #<rule prod-diff> #<rule expm1-udef> #<rule log1p-udef> #<rule hypot-udef> #<rule expm1-def> #<rule log1p-def> #<rule log1p-expm1> #<rule expm1-log1p> #<rule hypot-def> #<rule hypot-1-def> #<rule fma-def> #<rule fma-neg> #<rule fma-udef> #<rule asinh-def> #<rule acosh-def> #<rule atanh-def> #<rule acosh-2> #<rule asinh-2> #<rule sinh-asinh> #<rule sinh-acosh> #<rule sinh-atanh> #<rule cosh-asinh> #<rule cosh-acosh> #<rule cosh-atanh> #<rule tanh-asinh> #<rule tanh-acosh> #<rule tanh-atanh> #<rule sinh-neg> #<rule sinh-0> #<rule cosh-neg> #<rule cosh-0> #<rule sinh-undef> #<rule cosh-undef> #<rule tanh-undef> #<rule cosh-sum> #<rule cosh-diff> #<rule cosh-2> #<rule cosh-1/2> #<rule sinh-sum> #<rule sinh-diff> #<rule sinh-2> #<rule sinh-1/2> #<rule tanh-sum> #<rule tanh-2> #<rule tanh-1/2> #<rule tanh-1/2*> #<rule sum-sinh> #<rule sum-cosh> #<rule diff-sinh> #<rule diff-cosh> #<rule sinh-def> #<rule cosh-def> #<rule tanh-def-a> #<rule tanh-def-b> #<rule tanh-def-c> #<rule sinh-cosh> #<rule sinh-+-cosh> #<rule sinh---cosh> #<rule cos-asin> #<rule tan-asin> #<rule sin-acos> #<rule tan-acos> #<rule sin-atan> #<rule cos-atan> #<rule asin-acos> #<rule acos-asin> #<rule asin-neg> #<rule acos-neg> #<rule atan-neg> #<rule atan-tan-s> #<rule asin-sin-s> #<rule acos-cos-s> #<rule sin-asin> #<rule cos-acos> #<rule tan-atan> #<rule atan-tan> #<rule asin-sin> #<rule acos-cos> #<rule sin-sum> #<rule cos-sum> #<rule tan-sum> #<rule sin-diff> #<rule cos-diff> #<rule sin-2> #<rule sin-3> #<rule 2-sin> #<rule 3-sin> #<rule cos-2> #<rule cos-3> #<rule 2-cos> #<rule 3-cos> #<rule tan-2> #<rule 2-tan> #<rule sqr-sin-a> #<rule sqr-cos-a> #<rule diff-sin> #<rule diff-cos> #<rule sum-sin> #<rule sum-cos> #<rule cos-mult> #<rule sin-mult> #<rule sin-cos-mult> #<rule diff-atan> #<rule sum-atan> #<rule tan-quot> #<rule quot-tan> #<rule tan-hang-p> #<rule tan-hang-m> #<rule sin-neg> #<rule cos-neg> #<rule tan-neg> #<rule sin-0> #<rule cos-0> #<rule tan-0> #<rule cos-sin-sum> #<rule 1-sub-cos> #<rule 1-sub-sin> #<rule -1-add-cos> #<rule -1-add-sin> #<rule sub-1-cos> #<rule sub-1-sin> #<rule sin-PI/6> #<rule sin-PI/4> #<rule sin-PI/3> #<rule sin-PI/2> #<rule sin-PI> #<rule sin-+PI> #<rule sin-+PI/2> #<rule cos-PI/6> #<rule cos-PI/4> #<rule cos-PI/3> #<rule cos-PI/2> #<rule cos-PI> #<rule cos-+PI> #<rule cos-+PI/2> #<rule tan-PI/6> #<rule tan-PI/4> #<rule tan-PI/3> #<rule tan-PI> #<rule tan-+PI> #<rule tan-+PI/2> #<rule hang-0p-tan> #<rule hang-0m-tan> #<rule hang-p0-tan> #<rule hang-m0-tan> #<rule hang-p-tan> #<rule hang-m-tan> #<rule sum-log> #<rule diff-log> #<rule neg-log> #<rule log-prod> #<rule log-div> #<rule log-rec> #<rule log-pow> #<rule log-E> #<rule inv-pow> #<rule pow-base-0> #<rule pow-exp> #<rule pow-to-exp> #<rule pow-prod-up> #<rule pow-prod-down> #<rule pow-pow> #<rule pow-neg> #<rule pow-flip> #<rule pow-div> #<rule pow-sub> #<rule pow-unpow> #<rule unpow-prod-up> #<rule unpow-prod-down> #<rule pow1/2> #<rule pow2> #<rule pow1/3> #<rule pow3> #<rule exp-to-pow> #<rule pow-plus> #<rule unpow1/2> #<rule unpow2> #<rule unpow3> #<rule unpow1/3> #<rule unpow0> #<rule pow-base-1> #<rule unpow1> #<rule unpow-1> #<rule prod-exp> #<rule rec-exp> #<rule div-exp> #<rule exp-prod> #<rule exp-sqrt> #<rule exp-cbrt> #<rule exp-lft-sqr> #<rule exp-lft-cube> #<rule exp-sum> #<rule exp-neg> #<rule exp-diff> #<rule exp-0> #<rule exp-1-e> #<rule 1-exp> #<rule e-exp-1> #<rule rem-exp-log> #<rule rem-log-exp> #<rule cube-unmult> #<rule cbrt-prod> #<rule cbrt-div> #<rule cbrt-unprod> #<rule cbrt-undiv> #<rule cube-prod> #<rule cube-div> #<rule cube-mult> #<rule rem-cube-cbrt> #<rule rem-cbrt-cube> #<rule rem-3cbrt-lft> #<rule rem-3cbrt-rft> #<rule cube-neg> #<rule sqrt-prod> #<rule sqrt-div> #<rule sqrt-pow1> #<rule sqrt-pow2> #<rule sqrt-unprod> #<rule sqrt-undiv> #<rule neg-fabs> #<rule mul-fabs> #<rule div-fabs> #<rule fabs-fabs> #<rule fabs-sub> #<rule fabs-neg> #<rule fabs-sqr> #<rule fabs-mul> #<rule fabs-div> #<rule sqr-neg> #<rule sqr-abs> #<rule rem-square-sqrt> #<rule rem-sqrt-square> #<rule sub-div> #<rule frac-add> #<rule frac-sub> #<rule frac-times> #<rule frac-2neg> #<rule div-sub> #<rule times-frac> #<rule sum-cubes> #<rule difference-cubes> #<rule flip3-+> #<rule flip3--> #<rule div-inv> #<rule un-div-inv> #<rule clear-num> #<rule sub-neg> #<rule unsub-neg> #<rule neg-sub0> #<rule neg-mul-1> #<rule +-lft-identity> #<rule +-rgt-identity> #<rule --rgt-identity> #<rule sub0-neg> #<rule remove-double-neg> #<rule *-lft-identity> #<rule *-rgt-identity> #<rule /-rgt-identity> #<rule mul-1-neg> #<rule +-inverses> #<rule *-inverses> #<rule div0> #<rule mul0-lft> #<rule mul0-rgt> #<rule remove-double-div> #<rule rgt-mult-inverse> #<rule lft-mult-inverse> #<rule flip-+> #<rule flip--> #<rule swap-sqr> #<rule unswap-sqr> #<rule difference-of-squares> #<rule difference-of-sqr-1> #<rule difference-of-sqr--1> #<rule sqr-pow> #<rule pow-sqr> #<rule cancel-sign-sub> #<rule cancel-sign-sub-inv> #<rule distribute-lft-neg-in> #<rule distribute-rgt-neg-in> #<rule distribute-lft-neg-out> #<rule distribute-rgt-neg-out> #<rule distribute-neg-in> #<rule distribute-neg-out> #<rule distribute-frac-neg> #<rule distribute-neg-frac> #<rule distribute-lft-in> #<rule distribute-rgt-in> #<rule distribute-lft-out> #<rule distribute-lft-out--> #<rule distribute-rgt-out> #<rule distribute-rgt-out--> #<rule distribute-lft1-in> #<rule distribute-rgt1-in> #<rule count-2> #<rule associate-+r+> #<rule associate-+l+> #<rule associate-+r-> #<rule associate-+l-> #<rule associate--r+> #<rule associate--l+> #<rule associate--l-> #<rule associate--r-> #<rule associate-*r*> #<rule associate-*l*> #<rule associate-*r/> #<rule associate-*l/> #<rule associate-/r*> #<rule associate-/l*> #<rule associate-/r/> #<rule associate-/l/> #<rule +-commutative> #<rule *-commutative>) ((pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om)) (*.f64 n (*.f64 l (*.f64 l U*)))) #f))) |
| 1× | egg-herbie |
| 1074× | log-prod |
| 930× | associate-*r* |
| 894× | associate-*l* |
| 820× | cube-prod |
| 818× | swap-sqr |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 353 | 12549 |
| 1 | 943 | 12457 |
| 2 | 4117 | 12441 |
| 1× | node limit |
| Inputs |
|---|
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 (*.f64 l U*) n)) |
(*.f64 (*.f64 l U*) (*.f64 n l)) |
(*.f64 (*.f64 l (*.f64 l U*)) n) |
(*.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(*.f64 1 (*.f64 n (*.f64 l (*.f64 l U*)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (pow.f64 (cbrt.f64 n) 2) (*.f64 (cbrt.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2) (*.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) n)) |
(*.f64 (*.f64 l l) (*.f64 U* n)) |
(*.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*)))) |
(*.f64 (sqrt.f64 n) (*.f64 (sqrt.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 (*.f64 l (sqrt.f64 U*)) (*.f64 (*.f64 l (sqrt.f64 U*)) n)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (pow.f64 1 1/3) (*.f64 n (*.f64 l (*.f64 l U*)))) |
(*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3)) |
(*.f64 (*.f64 n (*.f64 l U*)) l) |
(*.f64 (*.f64 n (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 l (*.f64 l U*)))) |
(*.f64 (*.f64 n (*.f64 l l)) U*) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 U*))) (*.f64 l (sqrt.f64 U*))) |
(*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) |
(*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (sqrt.f64 n)) (sqrt.f64 n)) |
(*.f64 (*.f64 (*.f64 n l) l) U*) |
(*.f64 (*.f64 (*.f64 n l) U*) l) |
(*.f64 (*.f64 (*.f64 n l) 1) (*.f64 l U*)) |
(*.f64 (*.f64 (*.f64 n l) (cbrt.f64 (pow.f64 (*.f64 l U*) 2))) (cbrt.f64 (*.f64 l U*))) |
(*.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 l U*))) (sqrt.f64 (*.f64 l U*))) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) 1) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) |
(*.f64 1 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (sqrt.f64 (pow.f64 Om -2))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (pow.f64 Om -2) 1/2)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(*.f64 (sqrt.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) |
(*.f64 (pow.f64 1 1/2) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) 1/2) (pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) |
(*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) 1/2)) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) (sqrt.f64 Om)) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)))) (neg.f64 Om)) |
(pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1/2) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 3) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3) 1/3) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 2) |
(fabs.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)))) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3)) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 1)) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) 1) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 Om Om))) |
(*.f64 2 (/.f64 1 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) |
(*.f64 2 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 Om -2))) |
(*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 2 (pow.f64 Om -2))) |
(*.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 Om -2)) |
(*.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(*.f64 1 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) |
(*.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) (/.f64 2 Om)) |
(*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) |
(*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) |
(*.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) (/.f64 1 Om)) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 1) (/.f64 2 (*.f64 Om Om))) |
(*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)))) |
(*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 1 Om) (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(*.f64 (/.f64 1 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (cbrt.f64 (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) 1) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om)) |
(*.f64 (/.f64 (*.f64 n 2) 1) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 Om Om))) |
(*.f64 (/.f64 (*.f64 n 2) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 2) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 3) |
(pow.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)) 1/2) |
(pow.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3) 1/3) |
(pow.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) -1) |
(neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (*.f64 Om (neg.f64 Om)))) |
(sqrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) |
(log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3)) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) 3) (pow.f64 (*.f64 Om Om) 3))) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(exp.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
(pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 6) 1/6) |
(pow.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) 2) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
| Outputs |
|---|
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 -1 (*.f64 n (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) U*)))) |
(neg.f64 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U* (cbrt.f64 -1)))) |
(*.f64 n (neg.f64 (*.f64 (*.f64 l l) (*.f64 U* (cbrt.f64 -1))))) |
(*.f64 n (*.f64 (*.f64 l l) (*.f64 U* (neg.f64 (cbrt.f64 -1))))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(neg.f64 (*.f64 (*.f64 (pow.f64 -1 1/6) (/.f64 (*.f64 (*.f64 n l) (sqrt.f64 -2)) Om)) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (neg.f64 (pow.f64 -1 1/6)) (*.f64 (/.f64 n Om) (*.f64 l (sqrt.f64 -2)))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 n (sqrt.f64 (*.f64 U* U))) (/.f64 (/.f64 Om l) (sqrt.f64 -2))) (pow.f64 -1 7/6)) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(neg.f64 (*.f64 (*.f64 (pow.f64 -1 1/6) (/.f64 (*.f64 (*.f64 n l) (sqrt.f64 -2)) Om)) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (neg.f64 (pow.f64 -1 1/6)) (*.f64 (/.f64 n Om) (*.f64 l (sqrt.f64 -2)))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 n (sqrt.f64 (*.f64 U* U))) (/.f64 (/.f64 Om l) (sqrt.f64 -2))) (pow.f64 -1 7/6)) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(neg.f64 (*.f64 (*.f64 (pow.f64 -1 1/6) (/.f64 (*.f64 (*.f64 n l) (sqrt.f64 -2)) Om)) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (neg.f64 (pow.f64 -1 1/6)) (*.f64 (/.f64 n Om) (*.f64 l (sqrt.f64 -2)))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 n (sqrt.f64 (*.f64 U* U))) (/.f64 (/.f64 Om l) (sqrt.f64 -2))) (pow.f64 -1 7/6)) |
(*.f64 -1 (*.f64 (pow.f64 -1 1/6) (*.f64 (/.f64 (*.f64 n (*.f64 l (sqrt.f64 -2))) Om) (sqrt.f64 (*.f64 U U*))))) |
(neg.f64 (*.f64 (*.f64 (pow.f64 -1 1/6) (/.f64 (*.f64 (*.f64 n l) (sqrt.f64 -2)) Om)) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (neg.f64 (pow.f64 -1 1/6)) (*.f64 (/.f64 n Om) (*.f64 l (sqrt.f64 -2)))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 n (sqrt.f64 (*.f64 U* U))) (/.f64 (/.f64 Om l) (sqrt.f64 -2))) (pow.f64 -1 7/6)) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U* U))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 -1 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(neg.f64 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (neg.f64 (sqrt.f64 (*.f64 U* U)))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 -2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (cbrt.f64 -1) (*.f64 (pow.f64 l 2) (*.f64 U* U)))) (pow.f64 Om 2))) |
(*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 (*.f64 l l) (*.f64 (cbrt.f64 -1) (*.f64 U* U)))))) |
(*.f64 -2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* (*.f64 (cbrt.f64 -1) U))) Om))) |
(*.f64 (/.f64 -2 Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 (*.f64 U* (*.f64 (cbrt.f64 -1) U)) (*.f64 n n))) Om)) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U* U))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 (pow.f64 n 2) (*.f64 (pow.f64 l 2) (*.f64 U U*))) (pow.f64 Om 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 (pow.f64 l 2) U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 l (*.f64 (*.f64 l U*) n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 l U*) (*.f64 n l)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 l (*.f64 l U*)) n) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 1 (*.f64 n (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) |
(*.f64 (cbrt.f64 (*.f64 l (*.f64 U* (*.f64 n l)))) (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 2))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l l) (*.f64 n U*))) (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3)) |
(*.f64 (cbrt.f64 (*.f64 l (*.f64 U* (*.f64 n l)))) (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l l) (*.f64 n U*))) (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 2))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (cbrt.f64 (*.f64 l (*.f64 U* (*.f64 n l)))) (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l l) (*.f64 n U*))) (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 2))) |
(*.f64 (pow.f64 (cbrt.f64 n) 2) (*.f64 (cbrt.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2) (*.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 l l) (*.f64 U* n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (sqrt.f64 n) (*.f64 (sqrt.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 l (sqrt.f64 U*)) (*.f64 (*.f64 l (sqrt.f64 U*)) n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 n l) (*.f64 l U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2) 1/3) (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 (cbrt.f64 (*.f64 l (*.f64 U* (*.f64 n l)))) (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 2))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 l l) (*.f64 n U*))) (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 2))) |
(*.f64 (pow.f64 1 1/3) (*.f64 n (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3) (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2) 1/3)) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 3/2)) (cbrt.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 3/2))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2)) (cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3/2))) |
(*.f64 (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 3/2)) (cbrt.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 3/2))) |
(*.f64 (*.f64 n (*.f64 l U*)) l) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 n (pow.f64 (cbrt.f64 (*.f64 l (*.f64 l U*))) 2)) (cbrt.f64 (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 n (*.f64 l l)) U*) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 n (*.f64 l (sqrt.f64 U*))) (*.f64 l (sqrt.f64 U*))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (pow.f64 (cbrt.f64 n) 2)) (cbrt.f64 n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 l (*.f64 l U*)) (sqrt.f64 n)) (sqrt.f64 n)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 n l) l) U*) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 n l) U*) l) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 n l) 1) (*.f64 l U*)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(*.f64 (*.f64 (*.f64 n l) (cbrt.f64 (pow.f64 (*.f64 l U*) 2))) (cbrt.f64 (*.f64 l U*))) |
(*.f64 (*.f64 n l) (*.f64 (cbrt.f64 (pow.f64 (*.f64 l U*) 2)) (cbrt.f64 (*.f64 l U*)))) |
(*.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 l U*))) (sqrt.f64 (*.f64 l U*))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(-.f64 (exp.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) 1) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 1 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om))) |
(*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (sqrt.f64 (pow.f64 Om -2))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (pow.f64 Om -2) 1/2)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) Om) n))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 (*.f64 n l) (/.f64 Om n)) (*.f64 (*.f64 U l) U*)))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) Om))) |
(*.f64 (sqrt.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4)))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))))) |
(*.f64 (pow.f64 1 1/2) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(*.f64 (pow.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) 1/2) (pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) |
(*.f64 (sqrt.f64 (cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4)))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4))) (sqrt.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))))) |
(*.f64 (sqrt.f64 (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4))) (sqrt.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))))) |
(*.f64 (pow.f64 (/.f64 2 Om) 1/2) (pow.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) 1/2)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) Om) n))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 (*.f64 n l) (/.f64 Om n)) (*.f64 (*.f64 U l) U*)))) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (/.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) Om))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 1/2 Om) (*.f64 (/.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) Om) n)))) |
(/.f64 1 (sqrt.f64 (/.f64 1/2 (*.f64 (/.f64 n (*.f64 Om Om)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om 1/2) (/.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) Om)))) |
(/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 Om (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) (/.f64 Om n)))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 Om n) (/.f64 Om (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))))) |
(/.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 Om n) (/.f64 (/.f64 Om n) (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2)) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) -2))) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 -2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 -2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) (sqrt.f64 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (sqrt.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) Om) n))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n l) (/.f64 Om n)) (*.f64 (*.f64 U l) U*)))) (sqrt.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) Om))) (sqrt.f64 Om)) |
(/.f64 (neg.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)))) (neg.f64 Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1/2) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 1) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 3) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(pow.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3) 1/3) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(pow.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 2) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(fabs.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(log.f64 (exp.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(log.f64 (+.f64 1 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(cbrt.f64 (pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 3)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(exp.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1/2)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(exp.f64 (*.f64 (log.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) 1)) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(log1p.f64 (expm1.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (/.f64 1 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 2 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (*.f64 2 (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 Om -2)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 1 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) (*.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om)) 4)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om)) 4)) |
(*.f64 (cbrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4))) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (cbrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4))) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (*.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) 4)) (*.f64 (pow.f64 Om -2) (cbrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))))) |
(*.f64 (pow.f64 Om -2) (*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) 4)) (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))))) |
(*.f64 (pow.f64 Om -2) (*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) 4)) (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (*.f64 (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) -2) (/.f64 1 (*.f64 Om (neg.f64 Om)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)) (/.f64 2 Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (pow.f64 Om -2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n))) (/.f64 1 Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) (sqrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (*.f64 (/.f64 n (pow.f64 (cbrt.f64 Om) 2)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 n (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 1) (/.f64 2 (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 2 (*.f64 Om Om)) (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 2 (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (*.f64 (/.f64 n (pow.f64 (cbrt.f64 Om) 2)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 n (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(*.f64 (/.f64 1 Om) (*.f64 2 (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 1 (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (*.f64 (/.f64 n (pow.f64 (cbrt.f64 Om) 2)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 n (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om)) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) 4)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om)) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) 4)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) (*.f64 Om Om))) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) 4)) (/.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) 1) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) 4)) Om) (/.f64 (cbrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om)) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) 4)) (/.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) (*.f64 Om Om))) |
(*.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) 4)) (/.f64 (cbrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) (*.f64 Om Om))) |
(*.f64 (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4)) (cbrt.f64 (pow.f64 Om 4))) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) 4)) (cbrt.f64 (pow.f64 Om 4)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) 4)) (cbrt.f64 (pow.f64 Om 4)))) |
(/.f64 (cbrt.f64 (*.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) 4)) (/.f64 (cbrt.f64 (pow.f64 Om 4)) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) 1) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (*.f64 (/.f64 n (pow.f64 (cbrt.f64 Om) 2)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 n (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (*.f64 n 2) 1) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 Om Om))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(*.f64 (/.f64 (*.f64 n 2) (cbrt.f64 (pow.f64 Om 4))) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 (cbrt.f64 Om) 2))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (*.f64 (/.f64 n (pow.f64 (cbrt.f64 Om) 2)) (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*))))) |
(*.f64 (/.f64 2 (cbrt.f64 (pow.f64 Om 4))) (/.f64 n (/.f64 (pow.f64 (cbrt.f64 Om) 2) (*.f64 n (*.f64 l (*.f64 U* (*.f64 l U))))))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 2 (pow.f64 Om -2))))) (*.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om)))) |
(*.f64 (cbrt.f64 (*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2)))))) (pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om)) 4)) |
(*.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) (pow.f64 (cbrt.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om)) 4)) |
(pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(pow.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) 2) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(pow.f64 (cbrt.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 3) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(pow.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4)) 1/2) |
(sqrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4))) |
(sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4)) |
(sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4)) |
(pow.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3) 1/3) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(pow.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) -1) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(neg.f64 (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) (*.f64 Om (neg.f64 Om)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(sqrt.f64 (/.f64 (*.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U))) 2) 4) (pow.f64 Om 4))) |
(sqrt.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U)) 2) (/.f64 (pow.f64 Om 4) 4))) |
(sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))) 2) (pow.f64 Om 4)) 4)) |
(sqrt.f64 (*.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)) 2) (pow.f64 Om 4)) 4)) |
(log.f64 (pow.f64 (exp.f64 (/.f64 2 Om)) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(cbrt.f64 (pow.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))) 3)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(cbrt.f64 (/.f64 (pow.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2)) 3) (pow.f64 (*.f64 Om Om) 3))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(expm1.f64 (log1p.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(exp.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(exp.f64 (*.f64 (log.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2)))) 1)) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(log1p.f64 (expm1.f64 (*.f64 (*.f64 n 2) (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (pow.f64 Om -2))))) |
(/.f64 (*.f64 2 (*.f64 (*.f64 n n) (*.f64 (*.f64 l l) (*.f64 U* U)))) (*.f64 Om Om)) |
(*.f64 n (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 (*.f64 U l) U*)) (pow.f64 Om -2))))) |
(*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*))))) |
(-.f64 (exp.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) 1) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 1) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 3) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 6) 1/6) |
(pow.f64 (pow.f64 (*.f64 l (*.f64 U* (*.f64 n l))) 6) 1/6) |
(pow.f64 (pow.f64 (*.f64 (*.f64 l l) (*.f64 n U*)) 6) 1/6) |
(pow.f64 (*.f64 (sqrt.f64 n) (*.f64 l (sqrt.f64 U*))) 2) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(sqrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 2)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log.f64 (pow.f64 (exp.f64 n) (*.f64 l (*.f64 l U*)))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log.f64 (+.f64 1 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*)))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(cbrt.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(expm1.f64 (log1p.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(exp.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 l (*.f64 l U*)))) 1)) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
(log1p.f64 (expm1.f64 (*.f64 n (*.f64 l (*.f64 l U*))))) |
(*.f64 l (*.f64 U* (*.f64 n l))) |
(*.f64 n (*.f64 l (*.f64 l U*))) |
(*.f64 (*.f64 l l) (*.f64 n U*)) |
Compiled 97322 to 39096 computations (59.8% saved)
91 alts after pruning (85 fresh and 6 done)
| Pruned | Kept | Total | |
|---|---|---|---|
| New | 1959 | 39 | 1998 |
| Fresh | 32 | 46 | 78 |
| Picked | 0 | 1 | 1 |
| Done | 4 | 5 | 9 |
| Total | 1995 | 91 | 2086 |
| Status | Accuracy | Program |
|---|---|---|
| 9.4% | (fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2)))))))) | |
| 1.3% | (pow.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))) 2) | |
| 38.4% | (pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) | |
| 24.0% | (pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) | |
| 36.6% | (pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) | |
| 2.3% | (pow.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) 2) | |
| 27.4% | (pow.f64 (*.f64 (pow.f64 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) 2) | |
| 20.4% | (pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) | |
| 25.7% | (pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) 2) | |
| 34.2% | (pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) | |
| 6.9% | (/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) | |
| 6.9% | (/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) | |
| 9.5% | (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) | |
| 9.0% | (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) | |
| 12.0% | (/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) | |
| 12.1% | (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) | |
| 8.8% | (/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) | |
| 6.7% | (/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) | |
| 13.2% | (/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) | |
| 6.6% | (/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) | |
| 10.8% | (+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om)))) | |
| 11.6% | (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) | |
| 12.8% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) | |
| 7.7% | (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) | |
| 10.8% | (*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) | |
| 3.3% | (*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) | |
| 10.8% | (*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) | |
| 10.8% | (*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) | |
| 3.9% | (*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) | |
| 31.0% | (*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) | |
| 5.2% | (*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) | |
| 14.7% | (*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) | |
| 26.5% | (*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) | |
| 22.3% | (*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) | |
| 22.6% | (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) | |
| 9.5% | (*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) | |
| 22.5% | (*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) | |
| 26.4% | (*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) | |
| 26.6% | (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) | |
| 25.4% | (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) | |
| 22.3% | (*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) | |
| 8.9% | (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) | |
| 9.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) | |
| 6.9% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) | |
| 10.5% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) | |
| 6.3% | (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om)))) | |
| 5.4% | (*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) | |
| 13.5% | (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) | |
| 7.0% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) | |
| 7.1% | (*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) | |
| 36.7% | (*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) | |
| 7.2% | (*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) | |
| 6.7% | (*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) | |
| 7.2% | (*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) | |
| 10.9% | (*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) | |
| 2.8% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) 3) 1/3) U))) (*.f64 Om Om))) | |
| ✓ | 2.8% | (sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
| 6.5% | (sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) | |
| 16.6% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) | |
| ✓ | 14.3% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
| 10.6% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) | |
| 8.7% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) | |
| 13.9% | (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) | |
| 18.2% | (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) | |
| 4.3% | (sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) | |
| 2.5% | (sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) | |
| ✓ | 10.4% | (sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
| 6.9% | (sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) | |
| 10.9% | (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) | |
| 7.4% | (sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) | |
| ✓ | 39.6% | (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
| ✓ | 38.6% | (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| 7.5% | (sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) | |
| 15.2% | (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) | |
| 43.0% | (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) | |
| 7.0% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) | |
| 14.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))))) | |
| 13.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) | |
| 12.6% | (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) | |
| 6.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) | |
| 43.3% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) | |
| ✓ | 36.8% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| 42.4% | (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) | |
| 12.9% | (sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) | |
| 5.8% | (sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) | |
| 42.4% | (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) | |
| 7.0% | (sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) | |
| 8.9% | (expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) | |
| 34.4% | (exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) | |
| 4.9% | (exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) | |
| 6.1% | (exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
Compiled 2320 to 1620 computations (30.2% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) |
(*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) |
(sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om)))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) |
(pow.f64 (*.f64 (pow.f64 (fma.f64 (*.f64 l (+.f64 -2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (/.f64 l Om) t) 1/4) (pow.f64 (*.f64 2 (*.f64 n U)) 1/4)) 2) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 U) (log.f64 (*.f64 2 (*.f64 n (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)))))))) 2) |
(pow.f64 (pow.f64 (*.f64 U (*.f64 (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))) (*.f64 2 n))) 1/4) 2) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (cbrt.f64 (*.f64 l U))) (pow.f64 (cbrt.f64 (*.f64 l U)) 2))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n U*) Om) 2))))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om)))) |
(+.f64 (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) t) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 Om U)) (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2)))))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) 3) 1/3) U))) (*.f64 Om Om))) |
(fma.f64 -1 (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om)) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om U*)) -2) (*.f64 Om U))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (/.f64 n (/.f64 Om (*.f64 U (+.f64 (/.f64 n (/.f64 Om U*)) -2)))))))) |
(+.f64 (*.f64 1/2 (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 Om (+.f64 (*.f64 t U) (*.f64 -2 (/.f64 (*.f64 (pow.f64 l 2) U) Om))))) l) (sqrt.f64 (/.f64 1 (*.f64 U U*))))) (*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*)))) |
(fma.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 (*.f64 n (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2)) U) Om)) (*.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (+.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) -2) (*.f64 Om U))))))) |
(fma.f64 1/2 (*.f64 (/.f64 (sqrt.f64 2) (/.f64 l t)) (sqrt.f64 (/.f64 n (/.f64 (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)) U)))) (*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (log.f64 (pow.f64 (exp.f64 U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))))) |
(pow.f64 (pow.f64 (exp.f64 1/4) (fma.f64 -2 (log.f64 (/.f64 -1 n)) (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 l (*.f64 l (-.f64 U* U)))) (*.f64 Om Om)))))) 2) |
(sqrt.f64 (log.f64 (pow.f64 (exp.f64 (*.f64 2 (*.f64 n U))) (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n))))))) |
(fma.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U U*)) (*.f64 1/2 (/.f64 (*.f64 Om (*.f64 (fma.f64 -2 (/.f64 l (/.f64 (/.f64 Om U) l)) (*.f64 U t)) (sqrt.f64 2))) (/.f64 l (sqrt.f64 (/.f64 (/.f64 1 U) U*)))))) |
(sqrt.f64 (pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) 2)) (cbrt.f64 (log.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) |
(pow.f64 (exp.f64 (pow.f64 (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) 2)) (cbrt.f64 (log.f64 (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))))) |
(pow.f64 (fma.f64 1/4 (/.f64 (*.f64 (+.f64 t (/.f64 l (/.f64 Om (-.f64 (*.f64 l -2) (/.f64 (*.f64 l (*.f64 n U)) Om))))) (*.f64 (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*)))) (*.f64 Om Om))) (*.f64 n (*.f64 (*.f64 l l) U*))) (pow.f64 (exp.f64 1/4) (-.f64 (log.f64 (*.f64 -2 (/.f64 (*.f64 n n) (/.f64 (*.f64 Om Om) (*.f64 U (*.f64 l l)))))) (log.f64 (/.f64 -1 U*))))) 2) |
| Outputs |
|---|
(*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
8 calls:
| 865.0ms | Om |
| 739.0ms | l |
| 606.0ms | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 585.0ms | U |
| 519.0ms | t |
| Accuracy | Segments | Branch |
|---|---|---|
| 57.0% | 4 | n |
| 57.0% | 5 | U |
| 54.3% | 4 | t |
| 62.2% | 9 | l |
| 55.0% | 6 | Om |
| 53.2% | 3 | U* |
| 64.3% | 4 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 63.9% | 4 | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
Compiled 3693 to 1702 computations (53.9% saved)
| 3× | left-value |
| Time | Left | Right |
|---|---|---|
| 0.0ms | +inf | NaN |
| 0.0ms | 4.030002846142373e+151 | +inf |
| 0.0ms | 0.0 | 1.9062266353973006e-155 |
Compiled 43 to 31 computations (27.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) |
(*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) |
(sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) |
(*.f64 (sqrt.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)) (sqrt.f64 (*.f64 2 (*.f64 n U)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 n (*.f64 (*.f64 l (neg.f64 U)) (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 (neg.f64 Om)))) |
(pow.f64 (pow.f64 (*.f64 (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t) (*.f64 2 (*.f64 n U))) 1/4) 2) |
| Outputs |
|---|
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
8 calls:
| 740.0ms | Om |
| 551.0ms | l |
| 513.0ms | U |
| 394.0ms | n |
| 308.0ms | U* |
| Accuracy | Segments | Branch |
|---|---|---|
| 57.0% | 4 | n |
| 57.0% | 5 | U |
| 54.3% | 4 | t |
| 60.4% | 6 | l |
| 55.0% | 6 | Om |
| 53.2% | 3 | U* |
| 64.3% | 4 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 63.9% | 4 | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
Compiled 2968 to 1344 computations (54.7% saved)
| 3× | left-value |
| Time | Left | Right |
|---|---|---|
| 0.0ms | +inf | NaN |
| 0.0ms | 4.030002846142373e+151 | +inf |
| 0.0ms | 0.0 | 1.9062266353973006e-155 |
Compiled 43 to 31 computations (27.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) |
(*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) |
(sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
| Outputs |
|---|
(*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
8 calls:
| 574.0ms | Om |
| 564.0ms | U |
| 501.0ms | n |
| 499.0ms | l |
| 258.0ms | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
| Accuracy | Segments | Branch |
|---|---|---|
| 57.8% | 5 | n |
| 56.8% | 5 | U |
| 52.2% | 2 | t |
| 60.6% | 7 | l |
| 55.0% | 6 | Om |
| 51.4% | 2 | U* |
| 64.2% | 4 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 63.9% | 4 | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
Compiled 2864 to 1306 computations (54.4% saved)
| 3× | left-value |
| Time | Left | Right |
|---|---|---|
| 0.0ms | +inf | NaN |
| 0.0ms | 4.030002846142373e+151 | +inf |
| 0.0ms | 0.0 | 1.9062266353973006e-155 |
Compiled 43 to 31 computations (27.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) |
(*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) |
(sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
| Outputs |
|---|
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
8 calls:
| 434.0ms | l |
| 402.0ms | U* |
| 363.0ms | n |
| 351.0ms | U |
| 320.0ms | Om |
| Accuracy | Segments | Branch |
|---|---|---|
| 54.6% | 6 | n |
| 56.3% | 6 | U |
| 52.2% | 2 | t |
| 60.6% | 7 | l |
| 53.3% | 4 | Om |
| 51.4% | 2 | U* |
| 61.4% | 4 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 61.0% | 4 | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
Compiled 2839 to 1295 computations (54.4% saved)
| 3× | left-value |
| Time | Left | Right |
|---|---|---|
| 0.0ms | +inf | NaN |
| 0.0ms | 4.030002846142373e+151 | +inf |
| 0.0ms | 0.0 | 1.9062266353973006e-155 |
Compiled 43 to 31 computations (27.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 2 (*.f64 n (*.f64 t U))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 U (+.f64 t t))))) |
(pow.f64 (exp.f64 1/2) (log.f64 (*.f64 n (*.f64 t (+.f64 U U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 l (*.f64 -2 (fabs.f64 (*.f64 n (*.f64 l U))))) Om))) |
(expm1.f64 (log1p.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (neg.f64 (/.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (/.f64 (*.f64 Om Om) (*.f64 n (*.f64 l U))))))) |
(*.f64 (*.f64 (*.f64 (pow.f64 2 1/4) (*.f64 (pow.f64 2 1/4) (/.f64 1 Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (pow.f64 (pow.f64 (*.f64 n (*.f64 l (*.f64 l U*))) 3) 1/3) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (sqrt.f64 (*.f64 (fabs.f64 (*.f64 n (*.f64 l U))) (*.f64 (*.f64 n l) (-.f64 U* U)))) (/.f64 1 Om))) |
(*.f64 (sqrt.f64 (/.f64 -2 Om)) (*.f64 (sqrt.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))) (*.f64 (sqrt.f64 (*.f64 U n)) l))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (/.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) Om) (*.f64 l (*.f64 U n))))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (fma.f64 l -2 (*.f64 (/.f64 n (/.f64 Om (-.f64 U* U))) l)) (*.f64 (/.f64 l Om) U)))) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 2 n) (fma.f64 l -2 (/.f64 n (/.f64 (/.f64 Om (-.f64 U* U)) l))))) (sqrt.f64 (/.f64 Om (*.f64 l U)))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 (neg.f64 l) (*.f64 n U)) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (fabs.f64 (*.f64 n (*.f64 l U)))) Om))) |
(*.f64 (sqrt.f64 2) (+.f64 (*.f64 -1 (*.f64 l (sqrt.f64 (/.f64 U (-.f64 U* U))))) (*.f64 (/.f64 (*.f64 n l) Om) (sqrt.f64 (*.f64 (-.f64 U* U) U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (sqrt.f64 (pow.f64 (/.f64 Om (*.f64 l U)) 2))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 (/.f64 Om (sqrt.f64 (*.f64 l U))) (sqrt.f64 (*.f64 l U)))))) |
(sqrt.f64 (exp.f64 (*.f64 (log.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2))) 1/2))) |
(exp.f64 (log.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))))) |
(pow.f64 (exp.f64 (*.f64 1/4 (+.f64 (log.f64 (*.f64 -2 (*.f64 n U))) (*.f64 -1 (log.f64 (/.f64 -1 t)))))) 2) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 (*.f64 n U) (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t)))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l U) (*.f64 n (fma.f64 l -2 (*.f64 (/.f64 (-.f64 U* U) Om) (*.f64 n l)))))) (sqrt.f64 Om))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
8 calls:
| 706.0ms | Om |
| 622.0ms | l |
| 595.0ms | n |
| 529.0ms | U |
| 329.0ms | U* |
| Accuracy | Segments | Branch |
|---|---|---|
| 54.6% | 6 | n |
| 56.3% | 6 | U |
| 52.2% | 2 | t |
| 60.6% | 7 | l |
| 53.3% | 4 | Om |
| 51.4% | 2 | U* |
| 59.9% | 3 | (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) |
| 59.5% | 3 | (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*)))) |
Compiled 2814 to 1286 computations (54.3% saved)
| 6× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 38.0ms | 3.5321051878853715e+99 | 9.249828225582664e+100 |
| 19.0ms | 9.566047360102042e-66 | 1.4511479497250188e-65 |
| 33.0ms | 2.6169318068793233e-71 | 1.0296946708258686e-70 |
| 28.0ms | 1.465319889777341e-228 | 8.468769275903309e-227 |
| 65.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 86.0ms | -2.5894947584844063e+51 | -4.127212132325481e+49 |
| 157.0ms | 608× | body | 256 | valid |
| 54.0ms | 34× | body | 256 | infinite |
| 44.0ms | 231× | body | 256 | invalid |
Compiled 2194 to 1533 computations (30.1% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
(*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (*.f64 (*.f64 l (-.f64 U* U)) (*.f64 n (*.f64 n (*.f64 l U))))) Om)) |
(*.f64 (sqrt.f64 (/.f64 2 Om)) (sqrt.f64 (*.f64 (/.f64 U Om) (*.f64 (*.f64 n l) (*.f64 l (*.f64 n U*)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n U*) Om) 2) U)) Om))) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (/.f64 (*.f64 U (*.f64 (*.f64 n (*.f64 l l)) (*.f64 n U*))) (*.f64 Om Om)))) 1/2)) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (-.f64 U* U)) -2)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (/.f64 (*.f64 n (*.f64 (-.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om) 2) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 (fabs.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 (*.f64 2 n) (/.f64 (/.f64 Om (*.f64 l U)) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om)))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l U*)) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (/.f64 l (/.f64 Om U))))) |
(*.f64 (sqrt.f64 (-.f64 2 (/.f64 n (/.f64 Om (-.f64 U* U))))) (sqrt.f64 (*.f64 (/.f64 -2 Om) (*.f64 (*.f64 l U) (*.f64 n l))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(*.f64 (*.f64 (sqrt.f64 2) l) (sqrt.f64 (*.f64 n (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) (sqrt.f64 (/.f64 (/.f64 Om U) l))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U))))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (fabs.f64 (*.f64 (*.f64 n l) (-.f64 U* U))) Om)) (/.f64 Om (*.f64 l U))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 U (+.f64 t (*.f64 (/.f64 l Om) (-.f64 (*.f64 l -2) (*.f64 (/.f64 n Om) (*.f64 l U))))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 n (*.f64 l U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (+.f64 (*.f64 2 (/.f64 l (/.f64 Om l))) (*.f64 n (*.f64 (pow.f64 (/.f64 l Om) 2) (-.f64 U U*)))))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))) |
6 calls:
| 524.0ms | U |
| 435.0ms | n |
| 274.0ms | Om |
| 219.0ms | l |
| 192.0ms | t |
| Accuracy | Segments | Branch |
|---|---|---|
| 54.6% | 6 | n |
| 56.0% | 6 | U |
| 52.2% | 2 | t |
| 57.5% | 4 | l |
| 53.3% | 4 | Om |
| 51.4% | 2 | U* |
Compiled 2241 to 1015 computations (54.7% saved)
| 3× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 35.0ms | 3.5321051878853715e+99 | 9.249828225582664e+100 |
| 93.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 41.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 127.0ms | 384× | body | 256 | valid |
| 23.0ms | 123× | body | 256 | invalid |
| 4.0ms | 24× | body | 256 | infinite |
Compiled 1206 to 856 computations (29% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
(*.f64 (sqrt.f64 (+.f64 n n)) (sqrt.f64 (*.f64 t U))) |
(*.f64 (sqrt.f64 (+.f64 t t)) (sqrt.f64 (*.f64 n U))) |
(pow.f64 (cbrt.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 3/2) |
(pow.f64 (cbrt.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 3/2) |
(exp.f64 (*.f64 (log.f64 (*.f64 2 (*.f64 n (*.f64 t U)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 U (+.f64 t t)))) 1/2)) |
(exp.f64 (*.f64 (log.f64 (*.f64 n (*.f64 t (+.f64 U U)))) 1/2)) |
(pow.f64 (*.f64 4 (pow.f64 (*.f64 n (*.f64 t U)) 2)) 1/4) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 2 (*.f64 n (*.f64 t U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/6) 3) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 U (+.f64 t t))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 1/4) 2) |
(pow.f64 (pow.f64 (*.f64 n (*.f64 t (+.f64 U U))) 2) 1/4) |
(pow.f64 (pow.f64 (*.f64 t (*.f64 2 (*.f64 n U))) 1/4) 2) |
(*.f64 (/.f64 (sqrt.f64 2) (/.f64 Om (*.f64 n l))) (sqrt.f64 (*.f64 U U*))) |
(*.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) Om) (sqrt.f64 (*.f64 U U*))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*)))) |
(/.f64 (*.f64 (sqrt.f64 2) (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 U U*)))) Om) |
(neg.f64 (/.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (/.f64 Om (sqrt.f64 (*.f64 U U*))))) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (/.f64 (sqrt.f64 2) Om)))) |
(*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (fma.f64 -2 (/.f64 l (/.f64 Om l)) t)) U))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (/.f64 (*.f64 -2 (*.f64 U (*.f64 n (*.f64 l l)))) Om))) |
(*.f64 (sqrt.f64 2) (*.f64 (/.f64 n (/.f64 Om l)) (sqrt.f64 (*.f64 U (-.f64 U* U))))) |
(*.f64 (sqrt.f64 (/.f64 n 1/2)) (/.f64 (sqrt.f64 (*.f64 n (*.f64 U U*))) (/.f64 Om l))) |
(*.f64 (*.f64 (/.f64 (sqrt.f64 2) Om) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) |
(/.f64 (*.f64 (*.f64 (sqrt.f64 2) (*.f64 n l)) (sqrt.f64 (*.f64 U (-.f64 U* U)))) Om) |
(*.f64 (*.f64 n l) (neg.f64 (*.f64 (sqrt.f64 (*.f64 U U*)) (*.f64 (/.f64 1 Om) (sqrt.f64 2))))) |
(*.f64 (*.f64 (sqrt.f64 (/.f64 2 (*.f64 Om Om))) (*.f64 n l)) (neg.f64 (sqrt.f64 (*.f64 U U*)))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t))) |
6 calls:
| 408.0ms | n |
| 405.0ms | U |
| 256.0ms | Om |
| 189.0ms | l |
| 101.0ms | t |
| Accuracy | Segments | Branch |
|---|---|---|
| 54.5% | 6 | n |
| 56.0% | 6 | U |
| 52.2% | 2 | t |
| 55.5% | 4 | l |
| 53.3% | 4 | Om |
| 51.4% | 2 | U* |
Compiled 1790 to 825 computations (53.9% saved)
| 5× | binary-search |
| 1× | narrow-enough |
| 1× | predicate-same |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 100.0ms | 15578085364308.88 | 92717887618384.56 |
| 16.0ms | 4.7050812759629275e-234 | 4.0158165707615317e-233 |
| 98.0ms | -8.353819913804934e-245 | -7.235768124524166e-248 |
| 63.0ms | -1.0843572505673756e-160 | -9.481020093368376e-166 |
| 141.0ms | -3.417189604016933e+42 | -9.64952497157474e+28 |
| 222.0ms | 576× | body | 256 | valid |
| 177.0ms | 657× | body | 256 | invalid |
| 3.0ms | 11× | body | 256 | infinite |
Compiled 2317 to 1555 computations (32.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 1 (*.f64 (/.f64 U Om) (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (neg.f64 (*.f64 (*.f64 U* U) (/.f64 2 (*.f64 Om Om)))) (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om)))) |
(/.f64 1 (sqrt.f64 (*.f64 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 l n)))) (-.f64 2 (*.f64 n (/.f64 (-.f64 U* U) Om)))) -1/2))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(sqrt.f64 (*.f64 (*.f64 U (-.f64 t (-.f64 (/.f64 (*.f64 2 (*.f64 l l)) Om) (/.f64 n (/.f64 (/.f64 (*.f64 Om Om) U*) (*.f64 l l)))))) (*.f64 2 n))) |
(sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) |
(*.f64 (sqrt.f64 2) (sqrt.f64 (*.f64 n (*.f64 t U)))) |
(*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) |
(*.f64 (sqrt.f64 (*.f64 n (*.f64 U 2))) (sqrt.f64 t)) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 2 t) n)) (sqrt.f64 U)) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
6 calls:
| 481.0ms | Om |
| 181.0ms | l |
| 122.0ms | n |
| 113.0ms | U* |
| 94.0ms | U |
| Accuracy | Segments | Branch |
|---|---|---|
| 52.2% | 4 | n |
| 54.1% | 3 | U |
| 52.1% | 2 | t |
| 55.5% | 4 | l |
| 54.4% | 6 | Om |
| 50.3% | 3 | U* |
Compiled 1381 to 650 computations (52.9% saved)
| 3× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 35.0ms | 3.5321051878853715e+99 | 9.249828225582664e+100 |
| 31.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 48.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 76.0ms | 384× | body | 256 | valid |
| 29.0ms | 168× | body | 256 | invalid |
| 4.0ms | 18× | body | 256 | infinite |
Compiled 1241 to 884 computations (28.8% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U U*) Om)) (/.f64 2 Om)) (*.f64 (*.f64 n (*.f64 l (*.f64 l U))) -2))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U))))) |
6 calls:
| 207.0ms | U |
| 121.0ms | n |
| 116.0ms | Om |
| 96.0ms | t |
| 95.0ms | l |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.7% | 3 | n |
| 49.7% | 6 | U |
| 46.8% | 4 | t |
| 55.5% | 4 | l |
| 50.7% | 5 | Om |
| 45.2% | 2 | U* |
Compiled 1163 to 553 computations (52.5% saved)
| 3× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 58.0ms | 1.5419092323021702e+122 | 1.6196777805068618e+134 |
| 33.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 44.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 86.0ms | 432× | body | 256 | valid |
| 34.0ms | 186× | body | 256 | invalid |
| 8.0ms | 48× | body | 256 | infinite |
Compiled 1427 to 1003 computations (29.7% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (*.f64 (+.f64 (/.f64 (*.f64 n (*.f64 l (-.f64 U* U))) Om) (*.f64 -2 l)) (*.f64 l U)) Om))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
6 calls:
| 150.0ms | U |
| 121.0ms | Om |
| 97.0ms | t |
| 96.0ms | l |
| 77.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.7% | 3 | n |
| 49.7% | 6 | U |
| 46.8% | 4 | t |
| 55.4% | 4 | l |
| 50.7% | 5 | Om |
| 45.2% | 2 | U* |
Compiled 1091 to 521 computations (52.2% saved)
| 3× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 38.0ms | 3.5321051878853715e+99 | 9.249828225582664e+100 |
| 34.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 48.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 79.0ms | 384× | body | 256 | valid |
| 29.0ms | 155× | body | 256 | invalid |
| 4.0ms | 23× | body | 256 | infinite |
Compiled 1234 to 877 computations (28.9% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
(sqrt.f64 (*.f64 -2 (*.f64 (+.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U U*))) (/.f64 2 Om)) (*.f64 n (*.f64 U (*.f64 l l)))))) |
(sqrt.f64 (*.f64 2 (*.f64 (*.f64 n (*.f64 l l)) (*.f64 U (+.f64 (*.f64 (/.f64 n Om) (/.f64 (-.f64 U* U) Om)) (/.f64 -2 Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (*.f64 l l) (*.f64 U (-.f64 (/.f64 n (/.f64 (*.f64 Om Om) (-.f64 U* U))) (/.f64 2 Om)))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))) |
6 calls:
| 95.0ms | Om |
| 95.0ms | t |
| 94.0ms | l |
| 76.0ms | U* |
| 72.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.7% | 3 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 51.5% | 3 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 1043 to 498 computations (52.3% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 35.0ms | 8.536636062902956e-29 | 2.0160148413404796e-26 |
| 44.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 53.0ms | 256× | body | 256 | valid |
| 19.0ms | 101× | body | 256 | invalid |
| 3.0ms | 15× | body | 256 | infinite |
Compiled 754 to 550 computations (27.1% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 Om (*.f64 (*.f64 l l) (*.f64 U (+.f64 2 (neg.f64 (/.f64 (*.f64 n (-.f64 U* U)) Om))))))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
6 calls:
| 89.0ms | l |
| 88.0ms | t |
| 88.0ms | Om |
| 67.0ms | U* |
| 67.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.7% | 3 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 50.8% | 3 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 948 to 456 computations (51.9% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 33.0ms | 8.536636062902956e-29 | 2.0160148413404796e-26 |
| 48.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 55.0ms | 256× | body | 256 | valid |
| 18.0ms | 100× | body | 256 | invalid |
| 2.0ms | 10× | body | 256 | infinite |
Compiled 747 to 543 computations (27.3% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (*.f64 (*.f64 U (*.f64 n (*.f64 l l))) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) |
6 calls:
| 106.0ms | l |
| 87.0ms | t |
| 84.0ms | Om |
| 78.0ms | n |
| 65.0ms | U* |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.5% | 3 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 51.0% | 5 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 903 to 436 computations (51.7% saved)
| 4× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 50.0ms | 3.2715704757132775e+113 | 7.547668895549083e+115 |
| 59.0ms | 1.3940055001780604e+81 | 3.5321051878853715e+99 |
| 40.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 56.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 126.0ms | 544× | body | 256 | valid |
| 51.0ms | 248× | body | 256 | invalid |
| 13.0ms | 50× | body | 256 | infinite |
Compiled 1567 to 1150 computations (26.6% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 2 (/.f64 (*.f64 n (*.f64 l (*.f64 (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om)) U))) Om))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 l U))))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
6 calls:
| 104.0ms | t |
| 103.0ms | l |
| 94.0ms | Om |
| 85.0ms | U* |
| 82.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 45.3% | 3 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 48.5% | 3 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 837 to 413 computations (50.7% saved)
| 2× | binary-search |
| 1× | predicate-same |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 49.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 73.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 85.0ms | 272× | body | 256 | valid |
| 27.0ms | 89× | body | 256 | invalid |
| 4.0ms | 15× | body | 256 | infinite |
Compiled 743 to 551 computations (25.8% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 -2 (/.f64 n (/.f64 (/.f64 (/.f64 Om U) (-.f64 2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 l l))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
6 calls:
| 137.0ms | U* |
| 106.0ms | Om |
| 95.0ms | l |
| 92.0ms | t |
| 53.0ms | U |
| Accuracy | Segments | Branch |
|---|---|---|
| 43.0% | 1 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 47.4% | 3 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 771 to 385 computations (50.1% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 45.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 51.0ms | -1.8258521502828967e+127 | -9.116952902421269e+124 |
| 61.0ms | 240× | body | 256 | valid |
| 26.0ms | 106× | body | 256 | invalid |
| 3.0ms | 13× | body | 256 | infinite |
Compiled 768 to 562 computations (26.8% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(/.f64 (sqrt.f64 (*.f64 2 (*.f64 (*.f64 (*.f64 (*.f64 n n) l) U) (*.f64 l U*)))) Om) |
(/.f64 (sqrt.f64 (*.f64 n (*.f64 2 (*.f64 l (*.f64 n (*.f64 (*.f64 U l) U*)))))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 l (*.f64 U* (*.f64 n l))) U) (*.f64 n 2))) Om) |
(/.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) Om) |
(sqrt.f64 (*.f64 -2 (*.f64 (/.f64 (*.f64 (*.f64 n n) (*.f64 l l)) Om) (/.f64 (*.f64 U U) Om)))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 U Om) (/.f64 (*.f64 n (*.f64 n (*.f64 l l))) (/.f64 Om U*))))) |
(sqrt.f64 (*.f64 2 (*.f64 (/.f64 (*.f64 n n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 U U*))) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (/.f64 n Om) (/.f64 (*.f64 (*.f64 l l) (*.f64 U* U)) Om)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 n (*.f64 (/.f64 Om (*.f64 l l)) (/.f64 Om (*.f64 U U*)))))) |
(sqrt.f64 (*.f64 (*.f64 n 2) (*.f64 (/.f64 n (/.f64 Om l)) (/.f64 U (/.f64 Om (*.f64 l U*)))))) |
(sqrt.f64 (*.f64 (/.f64 2 Om) (/.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 n l)) (*.f64 U* U)) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 2 n) Om) (/.f64 (*.f64 l (*.f64 l (*.f64 n (*.f64 U* U)))) Om))) |
(sqrt.f64 (*.f64 (/.f64 (*.f64 n 2) Om) (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) Om))) |
(sqrt.f64 (/.f64 -2 (/.f64 Om (/.f64 (*.f64 (*.f64 n (*.f64 l (*.f64 n l))) (*.f64 U U)) Om)))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 l (*.f64 l (*.f64 n U*))) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 l l) (*.f64 U* n)) U))) (*.f64 Om Om))) |
(sqrt.f64 (/.f64 (*.f64 2 (*.f64 n (*.f64 (*.f64 (*.f64 n l) (*.f64 l U*)) U))) (*.f64 Om Om))) |
(*.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (*.f64 n 2))) (/.f64 1 Om)) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 n) (/.f64 (/.f64 (*.f64 Om Om) (*.f64 l l)) (*.f64 U U))))) |
(sqrt.f64 (*.f64 -2 (/.f64 (*.f64 n (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
(sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om n) (*.f64 (+.f64 2 (/.f64 n (/.f64 Om U))) (*.f64 l (*.f64 l U)))))) |
(/.f64 1 (sqrt.f64 (*.f64 1/2 (/.f64 Om (/.f64 (*.f64 (*.f64 n l) (*.f64 (*.f64 l U*) U)) (/.f64 Om n)))))) |
(/.f64 1 (sqrt.f64 (/.f64 (*.f64 Om Om) (*.f64 2 (*.f64 (*.f64 n n) (*.f64 U* (*.f64 l (*.f64 l U)))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (neg.f64 (*.f64 (*.f64 l (*.f64 l (-.f64 U U*))) (*.f64 n U))) (*.f64 Om Om)))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
6 calls:
| 88.0ms | Om |
| 86.0ms | l |
| 81.0ms | t |
| 70.0ms | U* |
| 44.0ms | U |
| Accuracy | Segments | Branch |
|---|---|---|
| 43.0% | 1 | n |
| 45.9% | 2 | U |
| 46.8% | 4 | t |
| 47.3% | 3 | l |
| 46.7% | 3 | Om |
| 44.8% | 3 | U* |
Compiled 728 to 366 computations (49.7% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 98.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 41.0ms | -1.8258521502828967e+127 | -9.116952902421269e+124 |
| 80.0ms | 86× | body | 256 | invalid |
| 50.0ms | 240× | body | 256 | valid |
| 3.0ms | 13× | body | 256 | infinite |
Compiled 719 to 534 computations (25.7% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om)))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) |
6 calls:
| 79.0ms | n |
| 76.0ms | U* |
| 55.0ms | t |
| 36.0ms | l |
| 32.0ms | Om |
| Accuracy | Segments | Branch |
|---|---|---|
| 44.1% | 3 | n |
| 44.8% | 2 | U |
| 44.8% | 2 | t |
| 47.3% | 3 | l |
| 45.7% | 3 | Om |
| 42.4% | 1 | U* |
Compiled 276 to 170 computations (38.4% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 36.0ms | 1.1274189802050259e-260 | 8.527888119523519e-257 |
| 55.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 61.0ms | 272× | body | 256 | valid |
| 22.0ms | 114× | body | 256 | invalid |
| 3.0ms | 13× | body | 256 | infinite |
Compiled 671 to 515 computations (23.2% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (/.f64 -2 (*.f64 (/.f64 1/2 (*.f64 n (*.f64 l l))) (/.f64 Om U)))) |
(*.f64 (*.f64 n l) (neg.f64 (sqrt.f64 (*.f64 U* (/.f64 (*.f64 U 2) (*.f64 Om Om)))))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 1 (/.f64 Om (sqrt.f64 (*.f64 (*.f64 U U*) 2)))))) |
| Outputs |
|---|
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) |
6 calls:
| 57.0ms | t |
| 35.0ms | U |
| 34.0ms | Om |
| 26.0ms | l |
| 13.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 39.6% | 1 | n |
| 41.7% | 3 | U |
| 39.6% | 1 | t |
| 45.4% | 3 | l |
| 42.4% | 3 | Om |
| 39.6% | 1 | U* |
Compiled 228 to 142 computations (37.7% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 75.0ms | 2.0400377843662356e+62 | 1.2387399871968306e+63 |
| 54.0ms | -1.0218917883575059e+37 | -2.464590520548526e+30 |
| 92.0ms | 240× | body | 256 | valid |
| 27.0ms | 130× | body | 256 | invalid |
| 5.0ms | 25× | body | 256 | infinite |
Compiled 583 to 451 computations (22.6% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
6 calls:
| 32.0ms | Om |
| 21.0ms | U |
| 9.0ms | l |
| 9.0ms | t |
| 8.0ms | n |
| Accuracy | Segments | Branch |
|---|---|---|
| 39.6% | 1 | n |
| 41.7% | 3 | U |
| 39.6% | 1 | t |
| 39.6% | 1 | l |
| 42.4% | 3 | Om |
| 39.6% | 1 | U* |
Compiled 170 to 112 computations (34.1% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 73.0ms | 1.3229874093625068e-235 | 5.038023024826e-225 |
| 96.0ms | -1.1033196083515085e-136 | -4.239194689702307e-142 |
| 107.0ms | 304× | body | 256 | valid |
| 45.0ms | 208× | body | 256 | invalid |
| 11.0ms | 59× | body | 256 | infinite |
Compiled 708 to 544 computations (23.2% saved)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 -4 (/.f64 (*.f64 (*.f64 n (*.f64 l l)) U) Om))) |
(sqrt.f64 (/.f64 (*.f64 -4 n) (/.f64 (/.f64 Om U) (*.f64 l l)))) |
(*.f64 n (*.f64 l (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U* U))) Om))) |
(*.f64 n (*.f64 (/.f64 l Om) (sqrt.f64 (*.f64 U* (*.f64 U 2))))) |
(*.f64 n (/.f64 l (/.f64 Om (sqrt.f64 (*.f64 U* (*.f64 U 2)))))) |
(/.f64 (*.f64 (*.f64 n l) (sqrt.f64 (*.f64 (*.f64 U U*) 2))) Om) |
(*.f64 l (*.f64 (neg.f64 n) (/.f64 (sqrt.f64 (*.f64 U* (*.f64 U 2))) Om))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) |
6 calls:
| 18.0ms | U |
| 15.0ms | U* |
| 8.0ms | Om |
| 7.0ms | n |
| 7.0ms | t |
| Accuracy | Segments | Branch |
|---|---|---|
| 39.6% | 1 | n |
| 41.2% | 3 | U |
| 39.6% | 1 | t |
| 39.6% | 1 | l |
| 39.6% | 1 | Om |
| 39.6% | 1 | U* |
Compiled 157 to 106 computations (32.5% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 107.0ms | 3.602209842620836e+53 | 1.3031612757424117e+56 |
| 105.0ms | 1.9728234982048428e-292 | 2.237787535990451e-287 |
| 105.0ms | 279× | body | 256 | invalid |
| 97.0ms | 272× | body | 256 | valid |
| 3.0ms | 11× | body | 256 | infinite |
Compiled 553 to 439 computations (20.6% saved)
Total -5.2b remaining (-13.7%)
Threshold costs -5.2b (-13.7%)
| Inputs |
|---|
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
| Outputs |
|---|
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) |
6 calls:
| 13.0ms | l |
| 11.0ms | U |
| 5.0ms | t |
| 5.0ms | Om |
| 5.0ms | U* |
| Accuracy | Segments | Branch |
|---|---|---|
| 38.6% | 1 | n |
| 40.8% | 3 | U |
| 38.6% | 1 | t |
| 40.5% | 3 | l |
| 38.6% | 1 | Om |
| 38.6% | 1 | U* |
Compiled 64 to 52 computations (18.8% saved)
| 2× | binary-search |
| 1× | narrow-enough |
| 1× | narrow-enough |
| Time | Left | Right |
|---|---|---|
| 111.0ms | 1.72806474114253e-99 | 1.563724893078326e-96 |
| 52.0ms | -6.528545650459811e-59 | -5.335409240807624e-61 |
| 106.0ms | 252× | body | 256 | invalid |
| 51.0ms | 240× | body | 256 | valid |
| 1.0ms | 4× | body | 256 | infinite |
Compiled 493 to 391 computations (20.7% saved)
| 1× | egg-herbie |
| 984× | distribute-lft-neg-in |
| 802× | neg-mul-1 |
| 668× | neg-sub0 |
| 504× | distribute-lft-neg-out |
| 484× | distribute-rgt-neg-in |
Useful iterations: 2 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 353 | 5760 |
| 1 | 498 | 5756 |
| 2 | 584 | 5752 |
| 3 | 676 | 5752 |
| 4 | 762 | 5752 |
| 5 | 959 | 5752 |
| 6 | 1512 | 5752 |
| 7 | 2060 | 5752 |
| 8 | 2572 | 5752 |
| 9 | 3023 | 5752 |
| 10 | 3319 | 5752 |
| 11 | 3501 | 5752 |
| 12 | 3559 | 5752 |
| 13 | 3582 | 5752 |
| 14 | 3783 | 5752 |
| 15 | 3873 | 5752 |
| 16 | 3898 | 5752 |
| 17 | 3909 | 5752 |
| 18 | 3921 | 5752 |
| 19 | 3926 | 5752 |
| 1× | fuel |
| 1× | saturated |
| Inputs |
|---|
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -7200000000000000530478866792185856) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7478419044781503/276978483140055660679575521154310658598553426872826080593424264214176807023660163124123274254828011726923049202224793480793868237276543994954010579940377664898144237780470377568655909939538265926807969022980227546033961457550130800932105433260772020185747203501713259671584768) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 69000000000000000903032597350861438139743388408870550925250476243246135402794388345722514381891174400) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))))))) |
(if (<=.f64 U -999999999999999939709166371603178586112) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (if (<=.f64 U -7884079580873887/8299031137761985917024815727382322302024892464484873799991314659381305622825816292799414097894207588576395773222601578364790302150823550615773749668227927374122363606803019047370752) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (if (<=.f64 U -4880765219094045/15744403932561434696684473303452629045213679255131528440951130063136634306810047014785327192773139116009306758441243430342744218096217082060889571263281690386187633395165356521866664817226721079737670210248565328244806179188238434160900023542852296724603729870848) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (if (<=.f64 U 8949657474523425/223741436863085634409521749481834675708763587282583222886261325799305187541819563744885033326754909183041871165773435313081225474664635755472226765949723278285256830531087594548959384855304521689414375064310509745905707450052637371994990524269330432) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (if (<=.f64 U 90000000000000) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t)))))))) |
(if (<=.f64 l -100000000000000005366162204393472) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7573630398360897/1081947199765842424529591879509026010150599323721976877318063532086628152436172512203606540057921920808293160946190599534351047801861499980289103827892100253508375928829962412377562148201321351276593628996016513851695161943555198441141036848674890703850575013678567420592128) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 4499999999999999974429565382633177664789268512599431293281255448379551384886050990420847233375141888) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U)))))))) |
(if (<=.f64 l -33999999999999999302479358166302720) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2423561727475487/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5599999999999999622815656080480564041611195158164819984099902059825304611980435056718514742829776896) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))))) |
(if (<=.f64 l -184999999999999999731250521761120256) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))))) |
(if (<=.f64 l -9499999999999999738913268399626780672) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(if (<=.f64 l -2050000000000000064826213728285360128) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) (if (<=.f64 l 1352433999707303/67621699985365151533099492469314125634412457732623554832378970755414259527260782012725408753620120050518322559136912470896940487616343748768068989243256265844273495551872650773597634262582584454787101812251032115730947621472199902571314803042180668990660938354910463787008) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 540000000000000001788220076480303997073366988570729021799767751435894969315857143197762381018038272) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (if (<=.f64 l 28000000000000000435663651625071604679509639113789720134353576252063345872613159691419590917621328534933775864299520) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))))) |
(if (<=.f64 l -9000000000000000086637831186808832) (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 432778879906337/2163894399531684849059183759018052020301198647443953754636127064173256304872345024407213080115843841616586321892381199068702095603722999960578207655784200507016751857659924824755124296402642702553187257992033027703390323887110396882282073697349781407701150027357134841184256) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -219999999999999990986243821054700378606165501089542949118813870396188310258005574755764848994566902909173407682264066804416512) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) (if (<=.f64 l 8655577598126739/270486799941460606132397969877256502537649830930494219329515883021657038109043128050901635014480480202073290236547649883587761950465374995072275956973025063377093982207490603094390537050330337819148407249004128462923790485888799610285259212168722675962643753419641855148032) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -6199999999999999985100297930331848418557233976528707717054250418194239215649783299123746483334290598289694052040255282285117440) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 1558003967662813/17311155196253478792473470072144416162409589179551630037089016513386050438978760195257704640926750732932690575139049592549616764829783999684625661246273604056134014861279398598040994371221141620425498063936264221627122591096883175058256589578798251261609200218857078729474048) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -9999999999999999538762658202121142272) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 7062951320071419/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -4100000000000000129652427456570720256) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 519999999999999967972319583654650286587951527928992692472643584) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))))) |
(if (<=.f64 Om -1475931496928081/3432398830065304857490950399540696608634717650071652704697231729592771591698828026061279820330727277488648155695740429018560993999858321906287014145557528576) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 Om 1324549306229467/7159725979618740301104695983418709622680434793042663132360362425577766001338226039836321066456157093857339877304749930018599215189268344175111256510391144905128218576994803025566700315369744694061260002057936311868982638401684395903839696776618573824) (*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(if (<=.f64 U 61718895773929/85720688574901385675874003924800144844912384936442688595500031069628084089994889799455870305255668650207573833404251746014971622855385123487876620597588598431476542198593847883368596840498969135023633457224371799868655530139190140473324351568616503316569571821492337341283438653220995094697645344555008) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 U 3900000000000000271308770885831504638653444426379034624) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) |
(if (<=.f64 U -6219301668019913/113078212145816597093331040047546785012958969400039613319782796882727665664) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 U 8850059985518291/38478521676166483605741250097796497856523182881313912761668255277583712667477744737709244389536050430475222646784) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
| Outputs |
|---|
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 (-.f64 U U*) n)))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 U (-.f64 t (fma.f64 2 (/.f64 (*.f64 l l) Om) (*.f64 (pow.f64 (/.f64 l Om) 2) (*.f64 n (-.f64 U U*))))))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (*.f64 n (-.f64 U* U)) (/.f64 l Om))) t))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 (/.f64 l Om) (*.f64 n (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (-.f64 U* U) (/.f64 l Om)))) t))) (sqrt.f64 (*.f64 2 n))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (/.f64 l Om) (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (/.f64 l Om) (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (/.f64 l Om) (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 n)) (sqrt.f64 (*.f64 U (fma.f64 (/.f64 l Om) (fma.f64 l -2 (*.f64 n (*.f64 (/.f64 l Om) (-.f64 U* U)))) t)))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 t U))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 U n)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 U t))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 U t))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 U t))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 0) (*.f64 (sqrt.f64 (*.f64 2 (*.f64 U t))) (sqrt.f64 n)) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) 50000000000000002312554067952099737000613136197536344245944363600636276876889825461691709941101712565994831225244845295459698844758220898317376004554752) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) +inf.0) (*.f64 (sqrt.f64 2) (/.f64 (sqrt.f64 (fma.f64 l -2 (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om))) (sqrt.f64 (/.f64 Om (*.f64 l (*.f64 n U)))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (-.f64 t (*.f64 2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 -2 (/.f64 (*.f64 l l) Om))) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (-.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U U*))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -2499999999999999983052371685904069941154271104860160) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 6491683198595055/540973599882921212264795939754513005075299661860988438659031766043314076218086256101803270028960960404146580473095299767175523900930749990144551913946050126754187964414981206188781074100660675638296814498008256925847580971777599220570518424337445351925287506839283710296064) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 8535058474086213/3414023389634485388328884116849283992138116261025744978122883999623187065762627620618973286846235796860380114223837819108295066446909114921146038298793384983600720680711175453933096082386848780661230088261573940214625662995187948181075905216512) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) (if (<=.f64 l 6216540455122333/62165404551223330269422781018352605012557018849668464680057997111644937126566671941632) (sqrt.f64 (*.f64 (*.f64 (*.f64 2 n) U) (+.f64 (+.f64 t (*.f64 (/.f64 (*.f64 l l) Om) -2)) (*.f64 (*.f64 n (pow.f64 (/.f64 l Om) 2)) (-.f64 U* U))))) (if (<=.f64 l 4553130216154053/474284397516047136454946754595585670566993857190463750305618264096412179005177856) (*.f64 (*.f64 (sqrt.f64 2) (/.f64 n (/.f64 Om l))) (neg.f64 (sqrt.f64 (*.f64 U U*)))) (if (<=.f64 l 3800000000000000021577608372573107159587869117828828795268767690901388308388496608331032890521419776) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U U*) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om)))))))))))))) |
(if (<=.f64 l -7200000000000000530478866792185856) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7478419044781503/276978483140055660679575521154310658598553426872826080593424264214176807023660163124123274254828011726923049202224793480793868237276543994954010579940377664898144237780470377568655909939538265926807969022980227546033961457550130800932105433260772020185747203501713259671584768) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 69000000000000000903032597350861438139743388408870550925250476243246135402794388345722514381891174400) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))))))) |
(if (<=.f64 l -7200000000000000530478866792185856) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7478419044781503/276978483140055660679575521154310658598553426872826080593424264214176807023660163124123274254828011726923049202224793480793868237276543994954010579940377664898144237780470377568655909939538265926807969022980227546033961457550130800932105433260772020185747203501713259671584768) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 69000000000000000903032597350861438139743388408870550925250476243246135402794388345722514381891174400) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))))))) |
(if (<=.f64 l -7200000000000000530478866792185856) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 7478419044781503/276978483140055660679575521154310658598553426872826080593424264214176807023660163124123274254828011726923049202224793480793868237276543994954010579940377664898144237780470377568655909939538265926807969022980227546033961457550130800932105433260772020185747203501713259671584768) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 69000000000000000903032597350861438139743388408870550925250476243246135402794388345722514381891174400) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))))))) |
(if (<=.f64 l -7200000000000000530478866792185856) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 7478419044781503/276978483140055660679575521154310658598553426872826080593424264214176807023660163124123274254828011726923049202224793480793868237276543994954010579940377664898144237780470377568655909939538265926807969022980227546033961457550130800932105433260772020185747203501713259671584768) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 69000000000000000903032597350861438139743388408870550925250476243246135402794388345722514381891174400) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (/.f64 (*.f64 l (-.f64 (*.f64 2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (*.f64 (sqrt.f64 2) (*.f64 l (sqrt.f64 (*.f64 (/.f64 n Om) (*.f64 U (+.f64 -2 (*.f64 U* (/.f64 n Om))))))))))) |
(if (<=.f64 U -999999999999999939709166371603178586112) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (if (<=.f64 U -7884079580873887/8299031137761985917024815727382322302024892464484873799991314659381305622825816292799414097894207588576395773222601578364790302150823550615773749668227927374122363606803019047370752) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (if (<=.f64 U -4880765219094045/15744403932561434696684473303452629045213679255131528440951130063136634306810047014785327192773139116009306758441243430342744218096217082060889571263281690386187633395165356521866664817226721079737670210248565328244806179188238434160900023542852296724603729870848) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (if (<=.f64 U 8949657474523425/223741436863085634409521749481834675708763587282583222886261325799305187541819563744885033326754909183041871165773435313081225474664635755472226765949723278285256830531087594548959384855304521689414375064310509745905707450052637371994990524269330432) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (if (<=.f64 U 90000000000000) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 n l) (-.f64 U* U)) Om)) (/.f64 Om (*.f64 n (*.f64 l U))))))) (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t)))))))) |
(if (<=.f64 U -999999999999999939709166371603178586112) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (if (<=.f64 U -7884079580873887/8299031137761985917024815727382322302024892464484873799991314659381305622825816292799414097894207588576395773222601578364790302150823550615773749668227927374122363606803019047370752) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U -4880765219094045/15744403932561434696684473303452629045213679255131528440951130063136634306810047014785327192773139116009306758441243430342744218096217082060889571263281690386187633395165356521866664817226721079737670210248565328244806179188238434160900023542852296724603729870848) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (if (<=.f64 U 8949657474523425/223741436863085634409521749481834675708763587282583222886261325799305187541819563744885033326754909183041871165773435313081225474664635755472226765949723278285256830531087594548959384855304521689414375064310509745905707450052637371994990524269330432) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U 90000000000000) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U* U) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t)))))))) |
(if (<=.f64 U -999999999999999939709166371603178586112) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (if (<=.f64 U -7884079580873887/8299031137761985917024815727382322302024892464484873799991314659381305622825816292799414097894207588576395773222601578364790302150823550615773749668227927374122363606803019047370752) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U U*) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U -4880765219094045/15744403932561434696684473303452629045213679255131528440951130063136634306810047014785327192773139116009306758441243430342744218096217082060889571263281690386187633395165356521866664817226721079737670210248565328244806179188238434160900023542852296724603729870848) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (if (<=.f64 U 8949657474523425/223741436863085634409521749481834675708763587282583222886261325799305187541819563744885033326754909183041871165773435313081225474664635755472226765949723278285256830531087594548959384855304521689414375064310509745905707450052637371994990524269330432) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U 90000000000000) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U U*) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t)))))))) |
(if (<=.f64 U -999999999999999939709166371603178586112) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (if (<=.f64 U -7884079580873887/8299031137761985917024815727382322302024892464484873799991314659381305622825816292799414097894207588576395773222601578364790302150823550615773749668227927374122363606803019047370752) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U U*) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U -4880765219094045/15744403932561434696684473303452629045213679255131528440951130063136634306810047014785327192773139116009306758441243430342744218096217082060889571263281690386187633395165356521866664817226721079737670210248565328244806179188238434160900023542852296724603729870848) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (/.f64 (*.f64 l (-.f64 (*.f64 2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (if (<=.f64 U 8949657474523425/223741436863085634409521749481834675708763587282583222886261325799305187541819563744885033326754909183041871165773435313081225474664635755472226765949723278285256830531087594548959384855304521689414375064310509745905707450052637371994990524269330432) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (if (<=.f64 U 90000000000000) (sqrt.f64 (*.f64 2 (+.f64 (*.f64 n (*.f64 U t)) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 (-.f64 U U*) (*.f64 n l)) Om)) (/.f64 Om (*.f64 n (*.f64 U l))))))) (*.f64 (sqrt.f64 (+.f64 U U)) (sqrt.f64 (*.f64 n t)))))))) |
(if (<=.f64 l -100000000000000005366162204393472) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7573630398360897/1081947199765842424529591879509026010150599323721976877318063532086628152436172512203606540057921920808293160946190599534351047801861499980289103827892100253508375928829962412377562148201321351276593628996016513851695161943555198441141036848674890703850575013678567420592128) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 4499999999999999974429565382633177664789268512599431293281255448379551384886050990420847233375141888) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 l n))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 l -100000000000000005366162204393472) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 7573630398360897/1081947199765842424529591879509026010150599323721976877318063532086628152436172512203606540057921920808293160946190599534351047801861499980289103827892100253508375928829962412377562148201321351276593628996016513851695161943555198441141036848674890703850575013678567420592128) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 4499999999999999974429565382633177664789268512599431293281255448379551384886050990420847233375141888) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))))))))) |
(if (<=.f64 l -100000000000000005366162204393472) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 7573630398360897/1081947199765842424529591879509026010150599323721976877318063532086628152436172512203606540057921920808293160946190599534351047801861499980289103827892100253508375928829962412377562148201321351276593628996016513851695161943555198441141036848674890703850575013678567420592128) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 4499999999999999974429565382633177664789268512599431293281255448379551384886050990420847233375141888) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 l -100000000000000005366162204393472) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 7573630398360897/1081947199765842424529591879509026010150599323721976877318063532086628152436172512203606540057921920808293160946190599534351047801861499980289103827892100253508375928829962412377562148201321351276593628996016513851695161943555198441141036848674890703850575013678567420592128) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 4499999999999999974429565382633177664789268512599431293281255448379551384886050990420847233375141888) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (/.f64 (*.f64 l (-.f64 (*.f64 2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (/.f64 -2 (/.f64 (*.f64 (/.f64 1 (*.f64 U l)) (/.f64 Om (*.f64 n l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 -1 (*.f64 n (*.f64 l U))) Om)) (/.f64 Om (*.f64 l U)))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (neg.f64 (*.f64 n (*.f64 U l))) Om)) (/.f64 Om (*.f64 U l)))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (+.f64 (*.f64 l -2) (/.f64 (*.f64 (*.f64 U l) (neg.f64 n)) Om)) (/.f64 Om (*.f64 U l)))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 U l)) Om)) (/.f64 Om (*.f64 U l)))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 U l)) Om)) (/.f64 Om (*.f64 U l)))))))) |
(if (<=.f64 l -95999999999999992901724729769984) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 2354317106690473/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5799999999999999726160256233886320480619706769094175181061194999195979739150034826190007096737561684223802041064286311287822135328768) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (/.f64 (*.f64 l (-.f64 (*.f64 2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 2 n) (/.f64 (-.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 U l)) Om)) (/.f64 Om (*.f64 U l)))))))) |
(if (<=.f64 l -33999999999999999302479358166302720) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2423561727475487/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5599999999999999622815656080480564041611195158164819984099902059825304611980435056718514742829776896) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 -2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om)) U))) (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U))))))))))) |
(if (<=.f64 l -33999999999999999302479358166302720) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 2423561727475487/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5599999999999999622815656080480564041611195158164819984099902059825304611980435056718514742829776896) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 U l) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om))))))))))) |
(if (<=.f64 l -33999999999999999302479358166302720) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 2423561727475487/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5599999999999999622815656080480564041611195158164819984099902059825304611980435056718514742829776896) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (+.f64 t (/.f64 (*.f64 l (+.f64 (*.f64 l -2) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 U l) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om))))))))))) |
(if (<=.f64 l -33999999999999999302479358166302720) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 2423561727475487/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 5599999999999999622815656080480564041611195158164819984099902059825304611980435056718514742829776896) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U (-.f64 t (/.f64 (*.f64 l (-.f64 (*.f64 2 l) (/.f64 (*.f64 n (*.f64 l U*)) Om))) Om))))) (sqrt.f64 (*.f64 (*.f64 U l) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om))))))))))) |
(if (<=.f64 l -184999999999999999731250521761120256) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (*.f64 (*.f64 l U) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))))))))) |
(if (<=.f64 l -184999999999999999731250521761120256) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (*.f64 (*.f64 U l) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om)))))))))) |
(if (<=.f64 l -184999999999999999731250521761120256) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (*.f64 (*.f64 U l) (/.f64 (*.f64 n -2) (/.f64 (neg.f64 Om) (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om)))))))))) |
(if (<=.f64 l -9499999999999999738913268399626780672) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (if (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 l U) (*.f64 n l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))))) |
(if (or (<=.f64 l -9499999999999999738913268399626780672) (not (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736))) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n)))))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) |
(if (or (<=.f64 l -9499999999999999738913268399626780672) (not (<=.f64 l 1742245718635205/87112285931760246646623899502532662132736))) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 (*.f64 n l) (*.f64 U l))) (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n)))))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) |
(if (<=.f64 l -2050000000000000064826213728285360128) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) (if (<=.f64 l 1352433999707303/67621699985365151533099492469314125634412457732623554832378970755414259527260782012725408753620120050518322559136912470896940487616343748768068989243256265844273495551872650773597634262582584454787101812251032115730947621472199902571314803042180668990660938354910463787008) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 540000000000000001788220076480303997073366988570729021799767751435894969315857143197762381018038272) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (if (<=.f64 l 28000000000000000435663651625071604679509639113789720134353576252063345872613159691419590917621328534933775864299520) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (/.f64 n Om) (-.f64 U* U)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))))) |
(if (<=.f64 l -2050000000000000064826213728285360128) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))) (if (<=.f64 l 1352433999707303/67621699985365151533099492469314125634412457732623554832378970755414259527260782012725408753620120050518322559136912470896940487616343748768068989243256265844273495551872650773597634262582584454787101812251032115730947621472199902571314803042180668990660938354910463787008) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 l 540000000000000001788220076480303997073366988570729021799767751435894969315857143197762381018038272) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))) (if (<=.f64 l 28000000000000000435663651625071604679509639113789720134353576252063345872613159691419590917621328534933775864299520) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (sqrt.f64 (*.f64 (*.f64 l (+.f64 -2 (*.f64 (-.f64 U* U) (/.f64 n Om)))) (*.f64 2 (*.f64 n (/.f64 l (/.f64 Om U)))))))))) |
(if (<=.f64 l -9000000000000000086637831186808832) (sqrt.f64 (*.f64 -2 (/.f64 (-.f64 2 (/.f64 (-.f64 U* U) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 432778879906337/2163894399531684849059183759018052020301198647443953754636127064173256304872345024407213080115843841616586321892381199068702095603722999960578207655784200507016751857659924824755124296402642702553187257992033027703390323887110396882282073697349781407701150027357134841184256) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -9000000000000000086637831186808832) (sqrt.f64 (*.f64 -2 (/.f64 (+.f64 2 (/.f64 (-.f64 U U*) (/.f64 Om n))) (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 432778879906337/2163894399531684849059183759018052020301198647443953754636127064173256304872345024407213080115843841616586321892381199068702095603722999960578207655784200507016751857659924824755124296402642702553187257992033027703390323887110396882282073697349781407701150027357134841184256) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -219999999999999990986243821054700378606165501089542949118813870396188310258005574755764848994566902909173407682264066804416512) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) (if (<=.f64 l 8655577598126739/270486799941460606132397969877256502537649830930494219329515883021657038109043128050901635014480480202073290236547649883587761950465374995072275956973025063377093982207490603094390537050330337819148407249004128462923790485888799610285259212168722675962643753419641855148032) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -219999999999999990986243821054700378606165501089542949118813870396188310258005574755764848994566902909173407682264066804416512) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (-.f64 2 (*.f64 n (/.f64 (neg.f64 U) Om)))))) (if (<=.f64 l 8655577598126739/270486799941460606132397969877256502537649830930494219329515883021657038109043128050901635014480480202073290236547649883587761950465374995072275956973025063377093982207490603094390537050330337819148407249004128462923790485888799610285259212168722675962643753419641855148032) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -219999999999999990986243821054700378606165501089542949118813870396188310258005574755764848994566902909173407682264066804416512) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (+.f64 2 (*.f64 (/.f64 U Om) n))))) (if (<=.f64 l 8655577598126739/270486799941460606132397969877256502537649830930494219329515883021657038109043128050901635014480480202073290236547649883587761950465374995072275956973025063377093982207490603094390537050330337819148407249004128462923790485888799610285259212168722675962643753419641855148032) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -219999999999999990986243821054700378606165501089542949118813870396188310258005574755764848994566902909173407682264066804416512) (sqrt.f64 (/.f64 -2 (/.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) (+.f64 2 (*.f64 n (/.f64 U Om)))))) (if (<=.f64 l 8655577598126739/270486799941460606132397969877256502537649830930494219329515883021657038109043128050901635014480480202073290236547649883587761950465374995072275956973025063377093982207490603094390537050330337819148407249004128462923790485888799610285259212168722675962643753419641855148032) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -6199999999999999985100297930331848418557233976528707717054250418194239215649783299123746483334290598289694052040255282285117440) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 1558003967662813/17311155196253478792473470072144416162409589179551630037089016513386050438978760195257704640926750732932690575139049592549616764829783999684625661246273604056134014861279398598040994371221141620425498063936264221627122591096883175058256589578798251261609200218857078729474048) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 (/.f64 l (/.f64 Om l)) -2)))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -6199999999999999985100297930331848418557233976528707717054250418194239215649783299123746483334290598289694052040255282285117440) (sqrt.f64 (/.f64 -2 (*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) 1/2))) (if (<=.f64 l 1558003967662813/17311155196253478792473470072144416162409589179551630037089016513386050438978760195257704640926750732932690575139049592549616764829783999684625661246273604056134014861279398598040994371221141620425498063936264221627122591096883175058256589578798251261609200218857078729474048) (sqrt.f64 (*.f64 (*.f64 2 (*.f64 n U)) (+.f64 t (*.f64 -2 (/.f64 l (/.f64 Om l)))))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -9999999999999999538762658202121142272) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 7062951320071419/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -9999999999999999538762658202121142272) (sqrt.f64 (/.f64 -2 (*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) 1/2))) (if (<=.f64 l 7062951320071419/69244620785013915169893880288577664649638356718206520148356066053544201755915040781030818563707002931730762300556198370198467059319135998738502644985094416224536059445117594392163977484884566481701992255745056886508490364387532700233026358315193005046436800875428314917896192) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 2 (*.f64 n (*.f64 U (+.f64 t (*.f64 l (*.f64 (/.f64 l Om) -2))))))))) |
(if (<=.f64 l -4100000000000000129652427456570720256) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))) (if (<=.f64 l 519999999999999967972319583654650286587951527928992692472643584) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (/.f64 -2 (*.f64 1/2 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l))))))))) |
(if (or (<=.f64 l -4100000000000000129652427456570720256) (not (<=.f64 l 519999999999999967972319583654650286587951527928992692472643584))) (sqrt.f64 (/.f64 -2 (*.f64 (/.f64 Om (*.f64 U (*.f64 l (*.f64 n l)))) 1/2))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U)))) |
(if (<=.f64 Om -1475931496928081/3432398830065304857490950399540696608634717650071652704697231729592771591698828026061279820330727277488648155695740429018560993999858321906287014145557528576) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 Om 1324549306229467/7159725979618740301104695983418709622680434793042663132360362425577766001338226039836321066456157093857339877304749930018599215189268344175111256510391144905128218576994803025566700315369744694061260002057936311868982638401684395903839696776618573824) (*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 (*.f64 U U*) 2)) Om))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(if (<=.f64 Om -1475931496928081/3432398830065304857490950399540696608634717650071652704697231729592771591698828026061279820330727277488648155695740429018560993999858321906287014145557528576) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 Om 1324549306229467/7159725979618740301104695983418709622680434793042663132360362425577766001338226039836321066456157093857339877304749930018599215189268344175111256510391144905128218576994803025566700315369744694061260002057936311868982638401684395903839696776618573824) (*.f64 (*.f64 n l) (neg.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U U*))) Om))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(if (<=.f64 Om -1475931496928081/3432398830065304857490950399540696608634717650071652704697231729592771591698828026061279820330727277488648155695740429018560993999858321906287014145557528576) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 Om 1324549306229467/7159725979618740301104695983418709622680434793042663132360362425577766001338226039836321066456157093857339877304749930018599215189268344175111256510391144905128218576994803025566700315369744694061260002057936311868982638401684395903839696776618573824) (*.f64 (/.f64 (sqrt.f64 (*.f64 2 (*.f64 U U*))) Om) (*.f64 n (neg.f64 l))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(if (<=.f64 U 61718895773929/85720688574901385675874003924800144844912384936442688595500031069628084089994889799455870305255668650207573833404251746014971622855385123487876620597588598431476542198593847883368596840498969135023633457224371799868655530139190140473324351568616503316569571821492337341283438653220995094697645344555008) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (if (<=.f64 U 3900000000000000271308770885831504638653444426379034624) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))))) |
(if (or (<=.f64 U 61718895773929/85720688574901385675874003924800144844912384936442688595500031069628084089994889799455870305255668650207573833404251746014971622855385123487876620597588598431476542198593847883368596840498969135023633457224371799868655530139190140473324351568616503316569571821492337341283438653220995094697645344555008) (not (<=.f64 U 3900000000000000271308770885831504638653444426379034624))) (sqrt.f64 (*.f64 (*.f64 n t) (*.f64 2 U))) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t)))) |
(if (<=.f64 U -6219301668019913/113078212145816597093331040047546785012958969400039613319782796882727665664) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (if (<=.f64 U 8850059985518291/38478521676166483605741250097796497856523182881313912761668255277583712667477744737709244389536050430475222646784) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))))) |
(if (or (<=.f64 U -6219301668019913/113078212145816597093331040047546785012958969400039613319782796882727665664) (not (<=.f64 U 8850059985518291/38478521676166483605741250097796497856523182881313912761668255277583712667477744737709244389536050430475222646784))) (sqrt.f64 (*.f64 (*.f64 n U) (*.f64 2 t))) (sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t)))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 t U))) |
(sqrt.f64 (*.f64 (*.f64 2 n) (*.f64 U t))) |
Compiled 2121 to 1269 computations (40.2% saved)
| 6× | egg-herbie |
| 1846× | prod-diff |
| 1654× | fma-def |
| 1598× | associate-*r* |
| 1392× | associate-*l* |
| 1382× | fma-def |
Useful iterations: 4 (0.0ms)
| Iter | Nodes | Cost |
|---|---|---|
| 0 | 24 | 83 |
| 1 | 60 | 79 |
| 2 | 196 | 79 |
| 3 | 972 | 75 |
| 4 | 4378 | 73 |
| 0 | 24 | 248 |
| 1 | 536 | 248 |
| 2 | 7704 | 248 |
| 0 | 24 | 83 |
| 1 | 60 | 79 |
| 2 | 196 | 79 |
| 3 | 972 | 75 |
| 4 | 4378 | 73 |
| 0 | 20 | 145 |
| 1 | 436 | 137 |
| 2 | 6413 | 137 |
| 0 | 24 | 83 |
| 1 | 60 | 79 |
| 2 | 196 | 79 |
| 3 | 972 | 75 |
| 4 | 4378 | 73 |
| 0 | 778 | 29290 |
| 1 | 2426 | 28286 |
| 2 | 7948 | 28166 |
| 0 | 466 | 13862 |
| 1 | 1351 | 13624 |
| 2 | 5761 | 13250 |
| 0 | 21 | 182 |
| 1 | 469 | 182 |
| 2 | 6722 | 182 |
| 0 | 711 | 22894 |
| 1 | 2187 | 22400 |
| 0 | 21 | 164 |
| 1 | 481 | 164 |
| 2 | 7284 | 164 |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
| 1× | node limit |
Compiled 2582 to 1231 computations (52.3% saved)
Compiled 1995 to 956 computations (52.1% saved)
Loading profile data...